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JulioHerrlein

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  1. Thanks, Stephane !
  2. For example: This syntax (expand-chord '(c4 69)) will give you a C(6,9) chord. Evaluate the expression via CMD+1 to get the snippet in notation. added 5 minutes later Maybe Janusz can help me here: When I evaluate this: (chord-inversion 1 (expand-chord '(c4 69))) I get this e4g4a4d5c6 However, when I try to get the snippet, via CMD+1, I get an error: > Error: The value e4g4a4d5c6 is not of the expected type list. > While executing: parse-chord-form-from-stream, in process Listener-1(6). > Type cmd-. to abort, cmd-\ for a list of available restarts. > Type :? for other options.
  3. Great idea, Torsten Very pedagogic example too. Thanks a lot. Im studying a lot of diatonic set Theory now, so I'm interested on mod 12 and mod 7 operations. The problem with the diatonic stuff is that is, in the lingo of Robert Morris, a pitch space with a irregular but periodic division. Best Julio
  4. Thank you, Torsten. You are digging a lot into the realm of modelling tonality. I think that this is really something more interesting than brownian motions, stochastic stuff, because there are many constraints in the tonality and also idiomatisms. Models like the xenakian one are amazing but the are in the realm of math. I'd like to find something more idiomatic. Best, Julio
  5. Thanks a lot, Stephane ! It's a kind of mapping. Best ! Julio
  6. I'm thinking about the formal conditions of the diatonic transposition. It may seem trivial, but actually is much more difficult than it appears. I think that modelling tonality and diatonic stuff is far more difficult than the 12-tone operations. One of the things I think is that in diatonic transposition you need to inform more to the machine, a kind of axis point or map, because the transposition of each degree is going to be different. In the case of the diatonic set, the MyHill property assures that each diatonic distance will be in exactly 2 sizes. Seconds: major and minor; Thirds: major and minor; Fourths: perfect and augmented; Fifths: perfect and diminished and so on... The Morris pitch spaces are also part of the problem... Do you have any hint in relation to this intuitions to share ? Maybe the way that OM make this operations ? Best, Julio
  7. Dear All, HAPPY 2018 !! With the new PCS organization in Opusmodus is possible to implement a concept of my book, called Combinatorial Voiceleading of Hexachords. From a Hexachord Set, is possible to find 10 different ways to combine the notes in the for of voice-leading sets. Each hexachord is divided in (3 + 3) way. This expression: (setf hexavl (mclist (chordize-list (integer-to-pitch (remove-duplicates (sort-asc (gen-divide 3 (flatten (permute (pcs '6-32))))) :test #'equal))))) Will result in this combination of the 6-32 hexachord, similar to the idea in the book. In the book, the material is organized in 70 pages of melodic and harmonic exercises. Here is a litte sample: CH_HERRLEIN.pdf The entire book: https://www.melbay.com/Products/Default.aspx?bookid=30042BCDEB Best ! Julio Herrlein
  8. Possible workaround: (remove-duplicates (sort-asc (combination 3 (pcs '6-1))) :test #'equal)
  9. I need a function to filter the Permutations. For example: (gen-divide 2 (flatten (permute (pcs '4-1)))) Will result in: ((0 1) (2 3) (0 1) (3 2) (0 2) (1 3) (0 2) (3 1) (0 3) (1 2) (0 3) (2 1) (1 0) (2 3) (1 0) (3 2) (1 2) (0 3) (1 2) (3 0) (1 3) (0 2) (1 3) (2 0) (2 0) (1 3) (2 0) (3 1) (2 1) (0 3) (2 1) (3 0) (2 3) (0 1) (2 3) (1 0) (3 0) (1 2) (3 0) (2 1) (3 1) (0 2) (3 1) (2 0) (3 2) (0 1) (3 2) (1 0)) But I don't mind with the order, since I'll make chords out of it, so ((0 1) (2 3) or (0 1) (3 2) or (1 0) (2 3) will result in the same chord. How to filter the list onto a list where the order does not matter ? Best, Julio
  10. Janusz suggested a different way for the expression: (setf voices 3) (setf chordstovl2 '(b3eb5g3 cs6e7gs3 b4f5g6 f7e5c2 d4f7e4 gs7e2a8)) (setf chordmelo (pitch-melodize chordstovl2)) (setf intervals (integer-to-interval (modus (pitch-to-midi chordmelo)))) (setf map (replace-map '((-11 1) (-10 2) (-9 3) (-8 4) (-7 5) (7 -5) (8 -4) (9 -3) (10 -2) (11 -1)) intervals)) (setf vlfinal (integer-to-pitch (modus (interval-to-pitch map :start (car chordmelo))))) (setf chordized (mclist (chordize-list (gen-divide voices vlfinal)))) (chord-closest-path (car chordized) chordized)
  11. Parsimonious Voice Leading (again): attempts to provide an algorithm In a previous post I deleted, I was trying to find a good way to ensure the minimal parsimonious Voice-Leading (VL) between a sequence of chords. In this post I will try to explain my second attempt. Let's take a look at a sequence of chords, spreaded out almost in a random way, with no VL (setf chordstovl2 '(b3eb5g3 cs6e7gs3 b4f5g6 f7e5c2 d4f7e4 gs7e2a8) Let's specify and evaluate a variable for the number of voices used: (setf voices 3) Let's try to think the best way to connect this pitches with minimal movement. I will apply the following expression to ensure a better and less ambiguous result when applying the CHORD-CLOSEST-PATH function. Evaluate voices before (setf voices 3) Then (setf chordized (mclist (chordize-list (gen-divide voices (setf vlfinal (integer-to-pitch (modus (interval-to-pitch (replace-map '((-11 1) (-10 2) (-9 3) (-8 4) (-7 5) (7 -5) (8 -4) (9 -3)(10 -2)(11 -1)) (integer-to-interval (modus (pitch-to-midi (setf chordmelo (pitch-melodize chordstovl2)))))) :start (car chordmelo))))))))) Please note the use of the replace-map function ensuring that no movement will be greater than a tritone away. This means that a movement like "C to G" (7 semitones) will be convertet in a G to C (5 semitones). This ensure a modulo 12 (octave constraint) reduction of all the material and also a constraint in terms of the size of the movements that will not exceed 6 semitones. Finally, I will apply the CHORD-CLOSEST-PATH function (chord-closest-path (car chordized) (chordize-list (gen-divide voices vlfinal))) Hope it help some VL efforts. Best, Julio Herrlein
  12. Great !!! New Year Version!! BEst ! Julio
  13. Thanks, Didier ! I'm looking forward for the new Opusmodus version. It willl be better for dealing with sets. Best ! Happy New Year ! Julio
  14. Dear Friends, I'm struggling to find a modulo 12 function Something like this: (mod12 '(0 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 24 48)) returns >> (0 1 2 3 4 5 6 7 8 9 10 11 0 1 2 3 4 5 6 7 0 0) Any Hint ? Best, Julio
  15. Congrats, Janusz! Looks Great! Merry Xmas!. Best Julio
  16. Looks interesting ! Looking forward ! Best. Merry Xmas, Janusz !
  17. Dear Wim I found your model very interesting and useful. It worked for me. Best ! Julio
  18. Dear Janusz, I presume that under each function there is a code that is hidden for the sake of elegance and for practical reasons. Actually, when using Opusmodus built-in functions we are working in a "pseudo-code". For example, last week André Meier wrote the code below, for tweaking lenghts. This could be transformed in a OM built-inl function, in a way that we could not see the entire code, only the call of the function. I'm asking where can I see the entire lisp code of the built in functions in order to learn to code my own functions, like André and Torsten. Best, Julio André Meier Function "lenght-staccato" (defun length-staccato (n alist) (let ((newlengths) (new-omn (omn-merge-ties (flatten alist))) (time-sign (get-time-signature alist))) (progn (setf newlengths (loop for i in (omn :length new-omn) when (> i 0) append (if (= n i) (list i) (list n (* -1 (abs (- i n))))) else collect i)) (if (omn-formp alist) (omn-to-time-signature (make-omn :length newlengths :pitch (omn :pitch new-omn) :velocity (omn :velocity new-omn) :articulation (omn :articulation new-omn)) time-sign) newlengths)))) (length-staccato 1/16 '(q -q q q)) (length-staccato 1/16 '(q e4 mp q tasto q -q q q)) (length-staccato 1/16 '((e. c4 eb4 fs4 a4 tie) (s a4 e. cs4 e4 g4 e bb4 tie) (e bb4 e. d4 f4 gs4 s b4)))
  19. Dear Torsten/Janusz Is there a way to see the Lisp Code underneath the existing functions of Opusmodus in order to learn ? Best, Julio
  20. Hey, Stephane! Thank you! Hope you like it. What a lovely combination! I feel very honored with this picture! Best! Julio added 2 minutes later Thank you, LOOPYC! It's really cool to have a physical book. Best regards and happy xmas to you! Best Julio
  21. Thanks a lot LOOPYC! Hope you like it! Best Julio
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