tag:blogger.com,1999:blog-96170112024-03-07T05:02:24.593+01:00Renewable MusicA displaced Californian composer writes about music made for the long while & the world around that music. ~
The avant-garde is flexibility of mind. — John Cage ~
...composition is only a very small thing, taken as a part of music as a whole, and it really shouldn't be separated from music making in general. — Douglas Leedy ~
My God, what has sound got to do with music! — Charles IvesDaniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.comBlogger1745125tag:blogger.com,1999:blog-9617011.post-10891669740036670572018-02-02T21:38:00.003+01:002018-02-02T21:38:59.775+01:00The Complete WZComposer Walter Zimmermann has greatly expanded his website, under his own Beginner Press label, with loads of scores and recordings, <a href="http://beginner-press.de/">here</a>. High recommended. Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com8tag:blogger.com,1999:blog-9617011.post-19744883879453940102018-02-02T21:33:00.003+01:002018-02-02T21:33:53.968+01:00Judy Dunaway Interviewed<a href="https://rwm.macba.cat/en/sonia/judy-dunaway-main/capsula">Here's a lively interview</a> with composer Judy Dunaway. Dunaway is perhaps best-known for her music for her own instrument of virtuosity, the balloon, but her music is about much more than those air-filled elastic vessels.Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com0tag:blogger.com,1999:blog-9617011.post-24614086920594771602017-04-11T21:13:00.000+02:002017-04-11T21:13:09.071+02:00Program Notes: Stage Patter<span><span><span data-ft="{"tn":"K"}"><span class="UFICommentBody"><span>What
a composer says about her or his music is often misdirection (intentional or not.) In this aspect,
composing can be thought of as a form of stage magic with a similar
arsenal of tricks (production, vanishing, transformation, restoration,
transposition, transportation, escape, levitation, penetration,
prediction.)</span></span></span></span></span>Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com2tag:blogger.com,1999:blog-9617011.post-63892878865768077932017-01-08T18:20:00.003+01:002017-01-08T18:20:52.067+01:00A Note on Accompaniment<span><span><span data-ft="{"tn":"K"}"><span class="UFICommentBody"><span>Why is it assumed that an accompaniment runs simultaneously with the
thing it's accompanying? When an adult accompanies a child to an event or the zoo,
say, or someone walks with a another person — or maybe a pet — on a
walk through a park or shopping mall, the accompaniment can be side by side or one ahead of the other. (Indeed, in crowded spaces, single file may be the rule rather than side-by-side.)
So why not more pieces in which the thing and its accompaniment are not
simultaneous, but just proximate, in the same neighborhood, keeping an
ear or eye out for the other? I could imagine a solo performed in the
first half of a concert with its accompaniment bopping in late in the
second half, for example... they're still attached, just on a longer
leash.</span></span></span></span></span>Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com1tag:blogger.com,1999:blog-9617011.post-47893497094450545352017-01-08T15:06:00.001+01:002017-01-16T18:49:42.671+01:00Lloyd Rodgers (1942-2016)<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi3-aV9Lgo25zOC_FAtHpUip5BvgpkivJXfSSleNKkJxkkTAVzjkR9AXfhYxzf_Tsxg1-Vh89Cfyp8XuNfqj3hduNuGD3Qqo1nYsxZ_1wUIpAWaqCwku3gIGBXglaxjW5egua5ueQ/s1600/Rodgers+The+Swing.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="216" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi3-aV9Lgo25zOC_FAtHpUip5BvgpkivJXfSSleNKkJxkkTAVzjkR9AXfhYxzf_Tsxg1-Vh89Cfyp8XuNfqj3hduNuGD3Qqo1nYsxZ_1wUIpAWaqCwku3gIGBXglaxjW5egua5ueQ/s320/Rodgers+The+Swing.jpg" width="320" /></a></div>
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The composer Lloyd Rodgers has left us. Born in Long Beach, California (June 2, 1942 - December 28, 2016, in San Diego), living away from Southern California only for two years in his first college teaching gig in Michigan. He studied, bachelor's-master's-doctorate, at UCLA, where, as a grad student, he was a close informant of Roy Harris (Harris would have Rodgers listen to the latest LPs that came his way and report back on them so that Harris wouldn't have to listen himself), a co-conspirator with Douglas Leedy, then low-man and house radical on the composition faculty totem pole, but considered his primary composition instructor to have been Mario Castelnuovo-Tedesco. He recently retired after 42 years tenure at California State University, Fullerton, where he became something of a local legend, a corrective or counter-force to institutional music making, through his teaching and through his work with a series of alternative music-making ensembles, notable the CSUF New Music Ensemble, the Cartesian Reunion Memorial Orchestra (the most prominent Southern California new music ensemble of its day not to be included in Los Angeles's edition of New Music America), a CSUF-based Diverse Instruments Ensemble (or D.I.E.) that was a kind of combination Collegium Musicum and Scratch Orchestra for experiments with historical and new music in open or reimagined instrumentations (typical program: arrangements of Satie, Zarlino and Bach), but also an excellent way for adventurous musicians to get University ensemble credit without having to deal with the usual choir, band, or orchestra, and his own professional ensemble, the Lloyd Rodgers Group. <br />
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Lloyd's compositional work began firmly in the avant-garde of the late 1960s, but with a commission from the Mirecourt Trio for a piano trio of classical dimensions, he made a decided turn to a modal or tonal world, in which cycles and repetitions were once again allowed, but without any sentimental attitude toward<i> The Tradition</i>. Many of the pieces were modular in construction and with an instrumentation to be determined in rehearsal (see the score of 1985's <i>The Swing</i>, above.) In co-founding the Cartesian Reunion Memorial Orchestra, he began to work with a democratic or collective environment pooling the members' compositional and instrumental resources. In principle, an "open" instrumentation group, its most stable grouping included Rodgers on sax, clarinet and keyboards, two or three additional keyboardists, vibraphone, guitar, cello, and electric bass, a mixture suggesting its unsettled relationship to both classical and pop groupings (though possibly more settled towards an early music mixed consort) but also directly connecting to the already-established East Coast ensembles of Reich and Glass and the experimental ensembles in England which Lloyd would later discover with great enthusiasm. (I first heard of the CRMO via an underground cassette with them playing a very odd arrangement of Liszt's <i>Lugubrious Gondola</i> v e r y s l o w l y.) In addition to his concert works, Lloyd had a long professional relationship with the choreographer Rudy Perez, and major works for dance included an <i>Orpheus</i> (1988) and <i>The Little Prince</i> (1987).<br />
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I didn't know Lloyd well enough and can only now regret this. He was one of those passionate musicians and teachers who used expletives with the frequency most of us use articles and conjunctions, would leave impossibly rude messages on his answering machine, was known to be both blunt in offering judgements but generous in extra hours of teaching well outside of any official classroom, and often in rooms where his favored "brown food" of coffee and cigarettes was either allowed or ignored. That passion could be easily confused with cynicism, sometimes even meanness, but it was a real and honest passion with only one direction: towards making honest and passionate music and making the world better by putting the music in it. He introduced me to the writings of the then-nearly forgotten Situationists via some underground publications in the early 80s, just one of the currents in his critical but independent engagement with music and the world around it. He was also one of those musical radicals who turned profoundly to the roots of music-making: the first lesson in his Counterpoint or Harmony course might be scheduled to meet not in some classroom but in a hardware store, so that students could buy all the materials needed to build a monochord (or, a one of Lloyd's students put it "the God machine.")<br />
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Lloyd's website is <a href="http://lloydrodgers.com/">here</a>, with lots of music to listen to, but not yet long-promised scores. A memorial page is on Facebook, <a href="https://www.facebook.com/groups/InMemoriamLloydRodgers/?ref=br_tf&qsefr=1">here</a>. My publishing enterprise, <a href="http://materialpress.com/start.htm">Material Press</a>, is fortunate to publish two of Lloyd's pieces, including the georgeous <i>Trio </i>(1975.)Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com2tag:blogger.com,1999:blog-9617011.post-57538251846863083202016-12-13T00:16:00.002+01:002017-01-08T15:06:50.188+01:00Erv Wilson (1928-2016)A note on the passing of the Mexican/American (dual national)
tuning theorist, Ervin M. Wilson on December 8th. Wilson, born in
Colonia Pacheco, Chihuahua, Mexico was a non-academic theorist
specializing in alternative tuning systems, their notation, and designs
for keyboard instruments to accommodate them. Principle points of
departure for his work were the generalized keyboards of Bosanquet, the
theory of "evolving tonality" of the Polish-American musicologist and
theorist Joseph Yasser, from which Wilson extrapolated wider varieties
of new scalar types (his "scale tree"), typically identified by a total
number of tones and a generating interval, and the arithmetic insights
of the Mexican theorist Agusto Novaro. He collaborated with Harry
Partch, Adrian Fokker, John H. Chalmers, Jr., and Lou Harrison. Wilson
explored scales and tuning systems in just intonation, equal
temperaments, and systems that do not easily fall into either category.
He designed a large number of instruments, principally keyboards (the
19-tone generalized Hackleman-Wilson clavichord was a notable example)
and mallet percussion and experimented with novel guitar frettings and
collected a large number of indigenous flutes with equally-spaced
fingers holes, thus approximating subharmonic series, along the lines
described by Kathleen Schlesinger.<br />
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/><br />
<br />
Above and beyond the large number of practical solutions for
instruments and notations typically presented in his virtuoso
draughtsman's manuscript (he was employed, for many years, in the
aerospace industry, as a draughtsman while also managing his ranch in
Chihuahua where he carried out experiments in corn and chenepod hybrids)
and the huge variety of techniques he developed for generating new
scales and systems with musically useful potential (see especially the
articles on the "Marwa Pemutations" and the "Purvi Modulations" as well
as his later work with sequences of intervals associated with patterns
in Pascal's Triangle, the "meta-meantone", "meta-slendro", "meta-pelog"
and "metal-mavila", in particular,) I believe one of his most valuable
contributions was the "combination-product set" which built upon his
insight that the "tonality diamond" of Partch (with a precedent in
Novaro, a diamond was basically a harmonic series multiplied by its
subharmonic mirror) was, at base, a selection of tones based on globally
organizing the factors of the (just) intervals between them. While the
diamonds tended, inevitably, to reinforce a single tonal center, the
Combination-Product Sets tended instead to be locally tonal while
globally centerless, rich in symmetrical intervallic structures, but
also rich in the total varieties of relationships found relative to each
tone, and all in a compact system of just intonation of, typically, 6,
20 or 70 tones in total. To some degree, one could find in such a rich
system a compelling alternative to many contemporary atonal practices in
12-equal. <br />
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width="640" /><br />
<br />
<br />
Wilson's
idea of a scalar "moment of symmetry", in which a generating interval
(a fifth, for example), within a given modulus (an octave, for example)
at certain numbers of iterations creates a pattern of scale step
symmetry in which the instances of the generator (and one closing,
anomalous interval) each subtend the same number of scalar steps,
appears to predate the notions of generated and well-formed scales
familiar to many in the academic theoretical community.<br />
<br />
Wilson's principle publications were made over many years in the informal journal of experimental music, <i>Xenharmonikon</i>.
The composer Kraig Grady hosts a large archive of Wilson's manuscripts
here: http://www.anaphoria.com/wilson.html A dissertation on Wilson's
music-theoretical work by Terumi Narushima is now in press.<br />
<br />
And this, too: Erv was a generous teacher and a friend. He had an amazing ear (I was once tuning some metal tubes in his workshop and, from time to
time from up in his room, he would shout out the ratios of intervals as
they were tuned up "135/128! 13/12! 64/45!") and a greater imagination
for new tuning systems, keyboards, and notati<span class="text_exposed_show">ons
that all came in families that propagated and mutated like those corn or
quinoa hybrids. He
taught with generosity, mostly at his dining table, with excursions,
when necessary, to the metallophones and bamboo marimbas and refretted
guitars and the wheezing old Scalatron in his living room, and always
began by asking if the student had anything to teach him first.</span>Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com3tag:blogger.com,1999:blog-9617011.post-58191833777303139682016-11-27T12:11:00.005+01:002016-11-27T12:11:37.300+01:00Pauline Oliveros<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi3nvdSpWy7lcSsKmZPyvoESk86iJ2fSYZHyjo64sk7s6R2SSggUFppeMRN2y8X_PGDcRxdO6lZKkQRiHVIAQt4lgJbIMANlH0yvE_UFhSR6ymyCzHrTOiHaofb3QUxTSeoEeJ7uw/s1600/MummaOliveros.jpg" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="321" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEi3nvdSpWy7lcSsKmZPyvoESk86iJ2fSYZHyjo64sk7s6R2SSggUFppeMRN2y8X_PGDcRxdO6lZKkQRiHVIAQt4lgJbIMANlH0yvE_UFhSR6ymyCzHrTOiHaofb3QUxTSeoEeJ7uw/s640/MummaOliveros.jpg" width="640" /></a>Pauline Oliveros had a rare presence and that presence will continue; it had a spiritual, even mystical, character, capable in her music of heights, yet was reliably down-to-earth, mostly tender, sometimes fierce, but often profoundly funny. She was a pioneer in musical theatre pieces (<i>Double Basses at Twenty Paces</i>, <i>Big Mother is Watching You</i>, <i>Crow II</i>, <i>Rose Moon</i>, <i>Njinga the Queen King</i>, <i>Io and Him and the Trouble with Her</i>, <i>The Island of Maps</i>), in the use of electronics in music (<i>I of IV</i>, <i>Bye-bye Butterfly, </i>and all of her work founding or co-founding electronic music studios and with the live music enhancement innovations of the Good Sound Foundation reflecting her continuous interest in sound <i>as</i> and <i>in</i> environments), and in her tight wire walk between composition and improvisation in which she found unique balance — and extra-musical echoes — in her special genre of innovation, the <i>sonic meditation</i>. She was always a performing musician — an accordionist, first (I have to note that the solo accordion part to Ramon Sender's astonishing <i>Desert Ambulance</i> was made for her, a part with verbal instructions on a parallel tape track heard only by the soloist), but also a horn and tuba player, singer, electronicist, and (see above) an occasional bandoneon player — but her instruments were just instruments, means to ends rather than virtuoso objects in themselves, and ends in question were, ultimately, sharing her own presence and making articulate its, and our, place in the environment.<br />
<br />
(As a Californian, I think I have to throw in the phrase "appropriate technology" here: Pauline's accordion would co-evolve with her, first being retuned in a just intonation with a series of just fifths on one side separated by just major thirds, and on the other the fifths separated by harmonic sevenths, later the whole thing becoming midi-fied, as an elaborate, bellows-breathing, controller.) <br />
<br />
May I note one aspect of her work that I find to have a powerfully feminist component? Though she had formidable chops in conventionally written notation (see, for example, her early <i>Song</i>s to texts by Duncan and Olson, the <i>Variations for Sextet</i>, or the <i>Trio for Flute, Piano and Page Turner </i>(I can't help but note the importance of her teacher, Robert Erickson, in arriving at these pieces)), her mature music did not privilege that form of transmission over texts, images (mandalas, in particular, or oral/aural-transmission. When Oliveros introduced herself and her <i>Sonic Meditations</i> in a 1971 issue of <i>Source: Music of the Avant-Garde</i> magazine, she was frank and most radically, for me, in her identification as a natural being (a two-legged human, to be exact, keeping the company of many animals) and with Sappho as an archetype (I suppose we'd now prefer 'role model') of suppressed women composers:<br />
<blockquote class="tr_bq">
<i>Pauline Oliveros is a two-legged human being, a female, lesbian, musician, composer among other things that contribute to her identity. She is herself and lives with her partner... along with assorted poultry, dogs, cats, rabbits and tropical hermit crabs. She is devoted to the elevation and equalization of the feminine principle along with the masculine principle. The feminine principle is subjugated in both women and men, personally and transpersonally. She believes that Sappho, the great Greek poetess was the archetype of women composers and that the destruction of her work by the early Christians is representative of a movement which eliminated and suppressed all models of women a creators in the arts. She is further devoted to uncovering, establishing, and encouraging new models to which women and the feminine side of men can relate.</i></blockquote>
<br />
The Sonic Meditations that followed were text scores, dedicated to the ♀ Ensemble (and that other pioneer, Amelia Earhart (!)) and were not intended primarily for concert performance but as "group work" for developing "positive energy." Now, some of this now has a somewhat dated or faded tone, given the whole "new age" or "human potential" thing that came in intervening years (and yes, to be honest, I'm not completely at ease with Oliveros's program of "Deep Listening" (though I have pushed enough for a not unrelated "slow listening", here)), but above and beyond its solely musical attractions, this work was prescient, honest, and suggested productive ways of changing the way in which people made and used music, not just as passive consumerism. And however faded, I suspect the next years will bring some new urgency to the more political, especially feminist, aspects of this work. I'm not sure exactly what Deep Listening is, and it may be, to some extent, musical snake oil (a thought Oliveros probably would have enjoyed laughing at) but, to the extent that it's not casual listening and that it opens musical listening up to the wider experience around the music, the people engaged in it, the environment around it, it's a good thing.<br /><br />There will likely be many memorials online and off, each focusing on different aspects of her work. Here I'd like to emphasize this environmental dimension, which I think has roots in the notion of her teacher Erickson that "every composer composes his/her environment", in the expansiveness of the Bay Area's emerging genre of theatre pieces (the "Chamber Opera" version of La Monte Young's <i>Poem for Chairs, Tables, Benches, etc.</i> may have been the first of the kind), and in work that Pauline and Douglas Leedy were first doing in the Bay Area in the 1960s, likely beginning with Leedy's garden party music <i>Exhibition Music 1964</i>, and continuing with self-sustaining electronic enviroments by both (Leedy's<i> Electronic Zodiac</i> and <i>Entropical Paradise</i> are the best-known examples of this work) but, ultimately, I think, for Oliveros, evolving into refined electronics for enhancing live instrumental and vocal performances. Ever a great collaborator, one of the major events in her early career was the first major festival of the work of David Tudor (for which event she wrote <i>Seesaw</i> for bandoneon and accordion duet (the players were on one such piece of playground equipment) with "possible minah bird obbligato" (yes, her pet bird participated)) and although Tudor began as a mentor, I think it was Oliveros's example that enouraged Tudor in his own environmental-musical concerns, from the scrapyard loudspeaker <i>Rainforest</i> to the insect sounds of <i>Dialects </i>or his later investigations of natural underwater sounds.<br /><br />
<br />
<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhnc9bwsAUwoHGD5wWX7pkd2djfYWwIsp6haEP7FFyNEsOp3OH3nz61bw4f0MJpWepM0TR-tV8eNS8R7lY-0ogV0PW1jx-9TBj_iKsc93Ze-2D4s25cHyEaJejTSwNuFZFMKna3Yw/s1600/Tudor%252C+Leedy%252C+Oliveros.bmp" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="221" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhnc9bwsAUwoHGD5wWX7pkd2djfYWwIsp6haEP7FFyNEsOp3OH3nz61bw4f0MJpWepM0TR-tV8eNS8R7lY-0ogV0PW1jx-9TBj_iKsc93Ze-2D4s25cHyEaJejTSwNuFZFMKna3Yw/s320/Tudor%252C+Leedy%252C+Oliveros.bmp" width="320" /></a></div>
<blockquote class="tr_bq">
<span style="font-size: x-small;"> (Photo: David Tudor, Douglas Leedy, N.N., Pauline Oliveros, ca, 1969)</span></blockquote>
Pauline Oliveros is dearly missed (have I mentioned that I already miss her voice, so comfortingly droll and slightly drawling?), but I'm certain she'd counsel that we use this opportunity to simply keep making music, her music, your music, our music, and pay deep attention to the world it is in.<br />
<br />Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com8tag:blogger.com,1999:blog-9617011.post-41575312184975675122016-08-01T04:28:00.000+02:002016-08-01T04:28:32.017+02:00Karl Kohn is 90Congratulations (as it happens, from Bali, but that's another post) to composer Karl Kohn on his 90th birthday! Although
Karl and his duo-pianistic partner Margaret Kohn have given up their
concertizing (they were perhaps the finest duo piano team in the US,
with fantastic performances of everything from En Blanc et Noir to
Visions de l'Amen, the Bartok Sonata, Structures, Piano Phase, the
Ligeti...), he continues to compose in his distinctive athematic style,
poised between total chromaticism and the local suggestion of the tonal.
Viennese-born, a student of Piston and Fine at Harvard, but longest in
California, which is marked by a certain touch of the fantastic that
often emerges in the desertDaniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com1tag:blogger.com,1999:blog-9617011.post-66278761356842523242016-07-19T15:46:00.001+02:002016-07-19T15:46:41.756+02:00Chris Brown in his Primes I don't have much to do with recordings, but I can recommend <a href="http://www.newworldrecords.org/album.cgi?rm=view&album_id=94309">this new one</a>, by Chris Brown, of his <i>Six Primes</i> for solo piano in a 13-limit just intonation, with each piece or movement in the set using a intervallically distinct subset of the tuning. (This is mining resources in a very rich tonal vein; Douglas Leedy's masterful <i>Pastorale</i> for chorus and retuned piano four-hands uses a tuning differing from Brown's by only two notes (for intonation enthusiasts: the 13s in <i>Six Primes</i> take the place of syntonic comma-lowered tones in<i> Pastorale</i>.) Although Brown and I shared teachers at Santa Cruz, the classicist N.O. Brown and composer Gordon Mumma, we were some years apart (his performance of a Pousseur piano work and work with homemade electronics were legend by my time) and have only met once or twice over the years, but each encounter with his music has been a strong one for me and this recording shows him at an exciting conjunction of long-term concerns, with what appears to my ears to be a potent balance between the compositionally strict and extemporaneous. Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com4tag:blogger.com,1999:blog-9617011.post-44405965778578911552016-06-26T16:59:00.001+02:002016-06-26T16:59:19.744+02:00A TempoJust to note that I've been particularly enjoying reading the journal <i>Tempo</i> of late. From the late Bob Gilmore's editorship to that of his estimable successor, Christopher Fox with a lively reviews section under Juliet Fraser, Tempo has been on a lively streak. In high school, I used to pour through back issues in the stacks of a local college, fascinated, as the topics in <i>Tempo</i> were reliably a little exotic to me. Though less parochial than the <i>Musical Times</i> with its strengths in music from the UK (with an apparent balance between mainstream, modernist, and experimental streams) and the continent, it was, for me, still a Brit's ear view of things, and I continue value it for just that, for frequently pointing out and orienting me to music with which I wouldn't have otherwise engaged.<br />
<br />
<br />Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com0tag:blogger.com,1999:blog-9617011.post-37217322819002745682016-05-28T10:12:00.002+02:002016-05-28T10:12:47.668+02:00Repression, Reduction...Resistance, RenaissanceSergej Newski <a href="https://van-us.atavist.com/repression-and-reduction">writes</a> about the lively radical music scene in Russia today, finding advantage at the margins of the officially possible (or, officially invisible), but straight to the roots of the musical.Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com0tag:blogger.com,1999:blog-9617011.post-26164997603196322782016-05-21T14:36:00.000+02:002016-06-01T22:49:08.405+02:00The Radical Music: Fragments of a ManifestoSounds articulate precise dimensions in physical space; musical sounds also articulate precise dimensions in social and private spaces.<br />
<br />
*****<br />
<br />
Use the minimum of resources or means required. Less is often more.<br />
<br />
Find the core question or idea in a work. Choose and use your materials to best frame that question or idea.<br />
<br />
All musical ideas and all musical instruments (save the vibra-slap) are potentially useful. None is universally useful. (Save the vibra-slap, which is never useful.)<br />
<br />
But having practiced the virtues of economy, allow yourself, from time to time, a bit of extravangance, some conspicuous production and consumption. In the end, the economy of musical production is like the bellows of a concertina, expansion necessarily paired with contraction.<br />
<br />
*****<br />
<br />
Go to extremes, in whichever parameter you use, including extremes of moderation.<br />
<br />
Question parameters. A parameter is someone else's way of dividing up the aural experience. Explore the edges and boundaries of and between pitch and timbre and rhythm and dynamic and form. Explore and break boundaries between music and not-music.<br />
<br />
Music, the physics of musical sound, the psychophysics of music, and the neuroscience of music are different concerns, each with its own territory and terminology. How might they relate? How might they not relate? What unique elements of cohesion does music bring to these disciplines and how can they extend the potential for new forms of musical activity?<br />
<br />
*****<br />
<br />
Follow an idea in all its consequences. Find the end of a process or pattern. Push a system to its design capacity and then push beyond it.<br />
<br />
However, if the consequences of a process are obvious, is it necessary to carry out the process in full?<br />
<br />
Consider the possibility of multiple versions, or realizations, of a work. Or accept the first version and move on to the next work without looking (listening) back.<br />
<br />
Break, subvert, or invert cause and effect.<br />
<br />
*****<br />
<br />
There is an indeterminant number of ways of arriving at the same musical surface and it's not possible to determine the best or most efficient or most elegant way. Worrying about this is an ethical issue, not an aesthetic one.<br />
Start from nothing, from first principles, without assumptions and build a better (sound) world from the ground up. Or start with everything and scrape, sculpt, and erase away, making the real, existing (wise, tired) world better.<br />
Limits and rules: anything we compose could, potentially, be through-composed, by taste and experience, but sometimes the alternative, carrying out rules applied to a limited set of materials, in the manner of a game (a music game, like a language game) carries much less anxiety and leads to surprises rather than the habitual.<br />
<br />
*****<br />
<br />
The radical music is about complexity. But not necessarily <em>that</em> complexity.<br />
Complexity is an elusive quality: It can be algorithmic complexity (for all that's worth) or the complexity of acoustical phenomena when heard in greater detail or the complexity of historical or social context. Sometimes highly dense phenomena can only be heard coarsely and sometimes the simplest of conditions can overwhelm the senses. A universally applicable and acceptable definition of either "sufficient" or "over-" complexity is impossible. (To paraphrase Potter Stewart, you know it when you hear it). When people make and listen to sounds, to music, one form or another of complexity is inevitable. Don't give it a second thought. No, strike that, don't give it the first thought, but keep it well in mind as a second.<br />
Every piece of music has an element of the improvisational, extemporaneous, accidental, capricious, prejudiced or arbitrary. Is a piece of music <em>interesting</em> because of this? Is a piece <em>musical</em> because of this? <br />
<br />
*****<br />
<br />
Experiment with scale, both the smallest, most local, and the grandest, most global, as well as the most anonymous quantities in-between.<br />
<br />
Boredom is only a function of time, and a function with several variables.<br />
<br />
*****<br />
<br />
Modest work done in a serious way, leavened with levity, can carry large ambitions.<br />
<br />
History is both a playground and a minefield, and a composer can and will write and rewrite music history with reckless disregard for the difference between a playground and a minefield.<br />
<br />
(2007, revised 2009)Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com8tag:blogger.com,1999:blog-9617011.post-51869084790994741392016-05-17T13:18:00.003+02:002016-05-17T13:18:22.545+02:00What is Counterpoint? (1)If I ever write a novel, it might be based on two women I happen to know, each in her early 40s, who meet periodically — once a month, if I recall correctly — for lunch at a franchise of a steakhouse chain in downtown Frankfurt. Not having much in common, they don't talk about much; they enjoy each other's company, but more than that, I surmise, they both like having that regular appointment with a good steak. Between lunches, they don't have any contact at all, as their personal and professional lives are otherwise completely independent from one another. In real life, each lives on opposite sides of the city and both are professionals: one woman is an attorney with a successful private practice in a niche area and has been married, mostly happily, for over 20 years, with a pair of high-achieving kids, the other is in marketing and has had some struggles with her career and personal life of late. In my novelization, I would take license and make these careers and lives even more separate from one another, with one woman having reduced to halftime work while her son, with a learning disability, finishes school while the other woman, with little in the way of settled domestic life, would be constantly on the move doing her work in international corporate espionage. The form of the book would be a series of steak lunches with both women together, not saying much of anything, settled and static, separated by pairs of solo chapters of great contrast, yet allowing each lifestyle to project its own range of securities, uncertainties, and even dangers. (Ideally, each pair of parallel chapters would be read simultaneously. Whether this could be invited by having the texts printed on facing pages, or in alternating lines of the text, or some other method altogether (think: left and right channels of an audio book), remains to be explored.) Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com0tag:blogger.com,1999:blog-9617011.post-41897460112541009562016-05-15T12:00:00.002+02:002016-05-15T12:00:41.388+02:00Notation(Composer Richard K.) Winslow's Law: If you want to repeat a piece of music exactly, learn it by rote. If you want to guarantee that it changes over time, write it down."<br />
<br />
(Chef) Jacques Pepin <a href="https://www.youtube.com/watch?v=4GokR2C9wy0&t=15m50s">stated</a> the equivalent: "The recipe is only the expression of one moment in time."Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com0tag:blogger.com,1999:blog-9617011.post-17313122959046470382016-05-14T17:45:00.000+02:002016-05-14T17:45:26.797+02:00Alvin Lucier is 85Congratulations to Alvin Lucier on his 85th birthday. He's doing very well and actively composing, which for Lucier means continuing to explore the ways in which a pieces of music can be composed so that acoustical phenomena are made more vivid. I'm told that his works-in-progress at this moment include a solo glockenspiel piece in which the attack and sustain are reflected off different walls in the performance space and a quartet for celli in which only bow pressure is used to change the pitches of the open strings. I'm fortunate to be able to call Alvin my teacher (indeed, my <i>Doktorvater</i>) and have worked as his publisher for many years. Here's to many more pieces, many more years!Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com1tag:blogger.com,1999:blog-9617011.post-83623794112580877142016-03-13T17:41:00.001+01:002016-03-13T17:43:32.522+01:00Z is for ZombieWhen the cultural history of the Obama years gets written, it will be hard to avoid the predominant role in television drama of the disaster-dominated genres: from internal conspiracies (both corporate and governmental) to alien, angelic/demonic, and time traveler invasions, to epidemics of the viral (both corporate and governmental) and supernatural (vampires, zombies, etc.) sorts, the serials have pictured a world (but usually focused on the US) under siege and struggling mightily, with heroes, villains and many posed ambiguously in-between. While this trend certainly build on long histories of prior examples and it got into gear during the Bush II years, it really exploded under Obama and I can't help but assume that this came in substantial part from Hollywood (usually presumed to be of the "left") cynically creating product for viewer demographics (usually presumed to be of the "right") that pointed to a huge audience potential for paranoid tales addressed to those who think that their natural hegemony in the world has been taken away. Each of the genres in question is well-suited to addressing one or another of the paranoid strains in our culture, with ethnic or racial and sexual themes vying with hidden exercise of abused corporate or state powers for the greater resonance and potential for volatile audience identification. At the same time, it must be acknowledged that the greater the catastrophe represented, the greater the opportunity for conflict-driven drama both compelling and complex enough to be sustainable over several seasons.<br />
<br />
Of all the genres represented in this era, I suspect that it is the zombie story that is going to be the one end times genre that most attaches itself, in future histories, to the Obama terms. While there are certainly elements of other genres, alien invasion (with aliens locatable in both a supposed Kenyan-born president and refugees or immigrants crossing borders, but also in the body-and-brain-snatched Kansans who so cheerfully continue to vote against their own best interests) or vampires (who inevitable have carried a charge that is both sexual and violent in their appearances in literature and dramatic media), that make strong competition and will likely continue to resonate in the future, the zombie, as notion and as dramatic form, offers both intrinsic and extrinsic qualities which strongly suggest that its shelf life is both limited in duration and limited to this era. The first reason is simply the failure of the zombie literature to come up with a fictional science that even plausibly accounts for the biology of a zombie, for example the energy requirements for indefinitely sustaining, let alone mobilizing, a zombic folk on ever scarcer sources of food. (This is, eventually, that problem of a parasite killing off its own host.) The second reason is that the limited brain function, i.e. focused solely on feeding and no longer capable of learning, make the long-term prospects for a walking brain dead rather low both as a fictional competing population and as a population with potential to generate further narratives. It is no wonder that zombie epics inevitably turn to more human-vs.-human competition and away from the human-against-zombie business as the zombies inevitably slow down, decay, and cease to increase their populations relative to the remaining humans who must have qualities of strength or intelligence, perhaps immunity, to have survived. <br />
<br />
I think the record of the Obama years has been and will be mixed, but it will be a valiant one, and it's a twist for all those who saw Obama as representing the head of an invading force. The twist is that Obama & Co. have not been the zombies, but rather the president-as-zombie-killer, with some (but, mind you, not enough) successes in a struggle against a resentful part of the population driven by ideas — zombie ideas — that are obviously dead but nevertheless continue to drive them forward <br />
<br />
*****<br />
<br />
Those observations made, I ought to say something about zombie ideas in music. There are definitely aspects of musical production and reception that, for better or worse, may likely (if not already) be seen as zombie ideas, for example the traditional manager, impresario, and publisher, or licensing income from broadcasts derived from advertising, But I don't think that actual ideas in music can become zombies. To restate Schoenberg's observation that "there is still plenty of good music to be written in C major", there are no zombie ideas in music, just zombie composers and players who make dull music by failing to discover the potential in even the oldest of ideas.<br />
<br />
(<i>This is the end of a second alphabet on this blog. The date and number of words in each item in these alphabets were determined by chance, the contents were through-composed.)</i><br />
<br />
<br />Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com0tag:blogger.com,1999:blog-9617011.post-14523014488032432632016-02-21T02:21:00.002+01:002016-05-22T12:23:55.589+02:00Brute Force and All ThatThis business with the FBI wanting Apple to create a tool to unlock the iPhone of the San Bernadino terrorists has been fascinating to follow, not least because it appears that the method the FBI has settled on is brute force — in this case, systematically trying every PIN combination — but brute force is here limited by the iPhone which allows only 10 mistaken attempts and then erases the data on the phone (or bricks it altogether — I've heard competing accounts), so the Bureau wants Cupertino to give them a way to shut down this 10-strikes-and-you're-out security feature. (Apple is refusing, for all kinds of really good, sensible, reasons which others explain elsewhere with more detail and authority.)<br />
<br />
Now, brute force is something that should be familiar to composers. For all of our plans and schemes and charts and systems, at some point there inevitably seem to be decisions to make that have to rely on brute force, rigorously trying out each solution on a list (whether formal or informal, in the head or on paper or screen) of possible solutions until one that works is found (the sketches of Beethoven or Ives sometimes suggest such a procedure.) If you're lucky, you stumble on a workable solution fast, but more often brute force gets refined as trial-and-error, optimally with successive error suggesting ways to sieve through the list to get more likely answers, but it can nevertheless be a damnably long process, and not a few composers find themselves bricking the work sometime along the way. (If you're really lucky, you get <i>both</i> the right answer and some insight into <i>why</i> it is the right answer along the way, an example of a piece revealing its own rules, or even "theory" in the course of composition.)<br />
<br />
Last night, I went to a pretty good performance of <i>The Makropulos Act </i>(alternatively: <i>Affair</i>, <i>Case</i>, <i>Matter</i>, <i>Secret</i>, or <i>Thing</i>.) Now, Janáček worked rather methodically with his vocal rhythms and contours based on spoken Czech musically heightened and he had a personal set of harmonic principles (not quite a <i>system</i>: categories and principles, somewhat along the lines of Hindemith.) But these together tend to function more as a spur to local invention than in any calculated continuity over greater distances (with two exceptions in <i>Makropulos</i>, in almost-arias given to the comic Count Hauk-Šendorf in the Second and E.M. herself in the Third Act) and his writing is ever being driven forward by a kind of brute force, a sustained intensity of imagination, or, as Morton Feldman, at times also a brute-forciste, put it: concentration.<br />
<br />
Brute force works by trying out all of the possible combinations or possibilities, typically in some logical order, which certainly helps to keep track of things when the list is long. And although I've been talking about going through lists while composing, in order to select an optimum item from the list for a finished score, this line of musing also invites some thought about the subject of exhausting such lists within works of music. [Simple example: much 12-tone music (not all, but much) features a succession of exhaustions of the 12-pitch class collection, some music extends this exhaustion to other aspects or parameters of the music.] Personally, I go back and forth on the issue. I use lists of all possible combinations all the time in my music, I love Gray codes (and Beckett Gray Codes in particular) and have recently been working with all the possible relationships in abstract time (that is, ignoring the precise durations) two or three or more sounds might have to one another. But if, for example, a strict process has been initiated, while I understand the aesthetic of letting the process continue to completion, to be perfectly honest, I'm not always on board with having to personally accompany it all the way to the end (to be honest, some health scares affected my attitude here, giving me some degree of seriousness to the question of how I spend my time that I didn't really have before.) Let me point to two very different recent articles on the topic: Dean Rosenthal, <a href="http://earreader.nl/archives/920">here</a>, on "Approaching Completeness" and a recent dissertation, by Zachary Bernstein (<i>Reconsidering Organicism in Milton Babbitt's Music and Thought </i>(sorry I don't have a more precise reference at hand)) which, among other interesting things, digs into the lists that <i>don't</i> get exhausted in the subject composer's music.Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com0tag:blogger.com,1999:blog-9617011.post-36020006084501393992016-02-09T15:09:00.000+01:002016-02-09T15:12:20.381+01:00Landmarks (52)Lloyd Rodgers: <i>Trio (1975).</i> A piano trio in one movement (<a href="http://www.lloydrodgers.com/trio.html">audio recording available here</a>) from a remarkable left coast composer who has stayed put on the left coast, neither seeking nor receiving much attention east of the Sierras. On the surface, this is a piece of tonal music with familiar features, 17-some minutes long, taking a grand neapolitan harmonic arch from A minor to a <i>chaccone </i>in Bb natural minor with a finale in a shimmering — yes, arpeggios and tremolos — A major bridged by the initial material, now in in Gb Major, and a Db Major <i>Adagio</i>. But nothing here is really as it seems, or, more precisely, nothing here happens quite <i>when</i> it should be expected happen but reliably, in hindsight (hindhearing?) exactly when it <i>ought</i> to have happened, as this is music about finding strangeness and beauty in the smallest temporal details. I've known this piece from a recording for years but only recently saw the score. It looked nothing like what I ever imagined. Through the use of spatial notation within metered measures — some of which looks like nothing other than a Schenker graph —, successions of measures of measured but unequal lengths, and, in the <i>Adagio</i>, non-metric recitative-like passages, Rodgers has assembled a set of tools which, in effect, revisit the radical potential of rubato and do so in a compelling and pragmatic way. (Special attention should be given to the solo piano introduction, in spatial-within-measures notation, which begins as if in the middle of things on a first inversion triad (sometime I should post a complaint about how composers have forgotten how powerful inversions can be! Rodgers never forgot!) and then allows successive harmonies to smear into one another, typically with grace note figurations. The feeling is less of extemporaneity than of a memory slowly coming into focus.) I have no idea how this ravishing music was actually made, how much method or how much <strike>improvisation, no madness</strike>, no <i>sensibility</i>, is in here, or what the proportion or balance between the two might be, but I'll claim it as a landmark of the west coast radical music, quite in company with the later works of Robert Erickson or of Rodgers's comrade Douglas Leedy, or his colleagues in the legendary Cartesian Reunion Memorial Orchestra, but also some of the Cold Blue composers. (I'll take a wild guess that Roy Harris's 1936 <i>Piano Quintet</i> is also in the DNA of Rodgers's<i> Trio</i>; Rodgers knew Harris well.) The minimal impulse, likely the best known aspect of the radical music, was to eliminate distractions (this was also the earliest definition of minimal visual art) in order to hear more of a sound or sounds in a music; here, Rodgers does exactly the same thing, using the non-distraction of a familiar tonal environment to force attention to musical time.Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com1tag:blogger.com,1999:blog-9617011.post-13592242141343998042016-02-04T21:29:00.001+01:002016-02-04T21:29:19.648+01:00Hold your breathSchoenberg, in his <i>Fundamentals of Musical Composition</i>, the small book in which he gets most clearly down to practical issues of form and his own stylistic tradition, identifies <i>the phrase </i>as the "smallest structural unit" (he calls it "a kind of musical molecule", thus implicitly putting the single tone or note (i.e. the things we count when we count to 12 tones (as one supposedly does when practicing a famous method of composition associated widely with Schoenberg's name)) at a kind of atomic level.) More interesting, to me, is his defining the structural meaning of the phrase as "a unit approximating to what one could sing in a single breath." This is very concrete and naturalistic as a definition and immediately gives the phrase, as a unit consuming some amount of time, both a certain range of duration and an implicit shape. Range: a breath can be short or long, regular or irregular, you can lose your breath, temporarily or altogether. An asthmatic (like Schoenberg himself) might well find his or her music marked by sudden stoppages and shortnesses of breath (see episodes of Schoenberg's String Trio or the rapid patter in parts of Pierrot Lunaire.) But at the same time, once you begin with breath as part of your premise, there is always the dialectical potential of breathlessness, non-stopping. Stravinsky damned the organ for never breathing, but traditionally, it's been the perpetual motion of the violin that has been associated with the diabolical. And shape: the phrase has to begin (obviously) and sometimes does so with signals, like pick-ups, and though it be the "smallest structural unit", it usually has an ending too, like a bit of punctuation (typically ,-ish, but also ?-ish, !-sh, or .-ish (I happen to like ;-ish or :-ish, such that the next phrase complements or explains/disambiguates the first) which could be rhythmic, either strong or weak, or pitch, often a falling off, Schoenberg noting the use of smaller intervals and fewer notes (or, as we'd say, a decline in density of activity (i.e. we're out-of-breath.) All of this, so far, could be useful in any kind of music with tones, but Schoenberg identifies some features that are distinctive to his own tonal-harmonic tradition, specifically that the phrase typically outlines a single harmony or a simple succession of harmonies (it is worth noting that Schoenberg, already in this "smallest structural unit" for a traditional tonal music finds himself using a linear expansion of a vertical sonority (or vice versa), a central premise of his own (much of it, post-common-practice-tonal) music) and that this outline is typically drawn from a small handful of techniques: arpeggiation, adding upbeats, altering rhythmic values, adding passing tones, appoggiaturas and cambiati, adding repetitions of tones, and ornamenting. So far so good. (You may exhale.)Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com1tag:blogger.com,1999:blog-9617011.post-55222206097043026912016-02-01T21:33:00.003+01:002016-02-01T22:29:27.447+01:00Symphonic Impromptu<i>An awkward repeat is like a bad second date.</i> A discussion among social media friends recently dove into the repeat of the exposition in the first movement of Brahms's <i>Fourth</i>. Most performances* are said to skip the repeat and we appeared to go along with the consensus that, as written, the effect was clumsy, even deadening (try it for yourself with a piano transcription) and this omission was less of a sin than the sin of committing a repeated exposition. Now, the awkward effect here, of jumping without tonal preparation from the Eb Major of the end of the exposition back into the c minor of its beginning, is and was awkward only within the context of the piece's own idiom. Jumps like it — indeed even tonally more exotic jumps — happened readily in other repertoire (for the stage, in particular) and just a generation or so later would become rather ordinary in much concert music (remember my assertion earlier here than concert music was not, traditionally, the platform for innovation that theatre music was), and the tonal relationship here, of relative Major to minor is not a distant one, but here, within the setting of a work of such classical qualities, associations, and aspirations, it was a jump not taken. Brahms, who managed both smooth and sudden changes of all sorts in his music, but also knew how to balance his propriety with his adventures, certainly knew better, but still he wrote that repeat marking. Did he write it wanting it taken, nevertheless and damn the clutziness? Did he want it taken as an option? Or was that marking just a bit of vistigial notational business, a functionless tail wagging the dog's historical consciousness in this landmark-in-the-making? (Not being a musicologist by trade or inclination, I can safely admit that I am foggy about an historical issue in notation and performance practice: at some point, the routine of taking repeat signs to mean actually — albeit perhaps with ornament or embellishment — repeating the material between ||:s and :||s, the ||:s and :||s actually became formal markers nodding to the tradition of repeating a structural unit before going on (or, in some cases, ending or even going <i>back even further</i>) and this point was certainly preceded by a long period of treating repeats as options (indeed the optional repeat was an essential tool in making music for dance, particularly social dances in which momentary decisions by hosts, musicians, dance masters or the dancers dancers themselves might requiring going forward, going back, or stopping on a dime (insert the locally and historically appropriate coinage) but at some juncture it simply became okay with everyone to write a repeat sign you didn't really mean to be taken as such and you could be rest assured that everyone would ignore said marking with all the bliss that conscientious ignorance gives us. Nothing to see here, move along. But then again: twenty or twenty-five years later, who'd jump at that jump anyway? Brahms's little bit of unprepared tonal motion went from <i>too awkward</i> to use the repeat to <i>not awkward enough</i> to use it. And that's a decent example of how tonal motion works (or doesn't) both within a piece of music and without it. <br />
<br />
<span style="font-size: x-small;">* I have to fess up that this "most performances" business is based on the word I've heard on the street and a quick search through several sources online, It is a traditional factoid or even dictum that I learned in school, but have never actually seen it back up by anything resembling actually statistics. I'll go along with the notion that it's been true for commericial recordings. But it could very well be that a majority of performances are taking the damn repeat and the larger musical community hasn't actually registered it, treating these double-dippings into the exposition as private eccentricities in local performances. But, for the moment, let's accept the (apparent) consensus and move on. Preferably from the exposition straight into the development.</span><br />
<br />Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com1tag:blogger.com,1999:blog-9617011.post-85398486509261544912016-01-28T18:42:00.000+01:002016-01-28T18:42:05.312+01:00Y is for YonderI've long had a toy theory that in the <i>Vorspiel</i> to <i>Das Rheingold</i>, via the entrances of the instruments and their relative positions in the pit, it's possible to tell which side of the Rhine you're supposed to be on, as the water moves from North to South. Of course, this theory gets mixed up somewhat with the unorthodox seating under the cover of the Bayreuth pit, but the notion that the physical placement of instruments in a space can lead to a sensation of motion is not fanciful at all. One of the features I neglected to mention in my post about Thomas Brodhead's edition of Ives's 4th Symphony is that Ives included fairly elaborate instructions regarding the dynamics in the second movement and how these might be refined through actual placement of the musicians, in some cases suggesting either physical movement of the players or an enlarged ensemble. To date, this appears not to have been done in performance, but it is surely worth trying. The potential for this was certainly evoked in Jose Serebrier's quadraphonic recording, in which the mobile perspective of the <i>composer/listener</i> is strongly suggested (in fact, I might now characterize Ives's approach as film sound design before films had sound design!)Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com0tag:blogger.com,1999:blog-9617011.post-20977185847854118402016-01-27T18:29:00.001+01:002016-01-27T18:29:33.439+01:00X is for Xenophilia<p dir="ltr">Sometimes, sending a score out into the world is like writing a love letter, addressee unknown.</p>
Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com0tag:blogger.com,1999:blog-9617011.post-35883844233332401452016-01-22T14:55:00.003+01:002016-01-22T14:55:58.379+01:00More than a Survival Guide to Ives's 4th<a href="https://www.youtube.com/watch?v=QjLYo5eRol4&feature=youtu.be">This video</a> may be on the musicologically wonkish side for some, but I find it fascinating: it's an introduction by Thomas Brodhead to his critical and performance edition of Ives's 4th Symphony. Brodhead has taken an admirable strategy to producing practically usable performance materials that both make difficult passages more readable for individual players, sections, and conductor(s) (it can be useful to have more than one conductor for sections of the work), but also preserves the many performance options that Ives left. Perhaps most importantly, for me, Brodhead restores the precise proportional time relationship between the main orchestra and the separate percussion ensemble in the fourth movement, something that has been basically faked in the past; this is regrettable, not least because with this relationship intact, the prescience of Ives's invention here is immediately obvious. Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com4tag:blogger.com,1999:blog-9617011.post-18694713240018661712016-01-21T21:54:00.001+01:002016-01-22T01:06:58.069+01:00W is for Waking<div dir="ltr">
Much, if not most, of my work composing is routine, even mechanical, realizing in details all the consequences of my grand plans and lesser follies. For this, the small hours of the night seem best, and drifting into dreams (and sometimes providential error!) reliably gives those details an added dose of fantasy that might otherwise be lost to the routine. Editing, the work I like least, is done best in the afternoon, the dullest part of my day. But it is in the waking moments that my best composing gets done, or better: begun, composing music at the same time you're composing yourself, and, when both fortunate and focused, being able capturing some of the spark remaining from the productive sense and nonsense of musical dream-work. It's not unusual for me to rush straight from bed, not quite awake, not quite still asleep to a keyboard or to paper and pen and try to capture just a few sounds from rapidly fading memory. Like trying to catch mercury. No, not transcribing whole, finished pieces from dreams, but carrying musical ideas and impulses from dreams forward into waking life and real music to be played and heard.</div>
Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com0tag:blogger.com,1999:blog-9617011.post-46337343118026298142016-01-20T22:12:00.001+01:002016-01-20T22:12:32.446+01:00V is for Velocity...it's as if we're in a contest between the speed of tongues and hands and fingers, the length of breath and bow arm, and the resonance of the sounding body or echo in the room all on one side and the speed of listening, the length of attention, and the acuity of memory on the other. And the magic is that neither side ever loses...Daniel Wolfhttp://www.blogger.com/profile/09093101325234464791noreply@blogger.com0