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Catalog of Works	Main Menu Deutsch current age of composition: 5 years, 5 months, 23 days
Biography	Base Phi Representations: Base Phi Minimum Binary B416 August 13, 2006 dedication: to Ron Knott Collection: IV place of composition: Hamburg, Germany duration: undefined instrumentation: percussion instruments of indefinite pitch or percussion instruments of definite pitch or pitched instruments temperament: undefined comments: The score for B416 is the same as the score for B417 (Base Phi Representations: Base Phi Maximum Binary). It is optional to play these workstogether or separately. Although the instrumentation is undefined, guidelines are given in the score. There are possibilities for percussion instruments as well as for pitched instruments. score: B416 doc file score 0.317 MB zip files 76 sequence members 0.044 MB 15127 10.958 MB 1364 0.735 MB 123 0.071 MB 24476 17.717 MB 2207 1.348 MB 199 0.094 MB 3571 2.125 MB 322 0.163 MB 5778 3.819 MB 521 0.239 MB 9349 6.149 MB 843 0.475 MB
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Previous Entry\|Next Entry Enter a catalog number into the box below (A1-A35, B1-B1331) to show that composition. also in this temperament Base Phi Representations: Base Phi Maximum Binary Lagged Fibonacci Generator no. 1 also written in Hamburg Φ Signature Sequence no. 7 Φ Signature Sequence no. 8 Φ Signature Sequence no. 9 Φ Signature Sequence no. 10 Φ Signature Sequence no. 11 Φ Signature Sequence no. 12 Φ Signature Sequence no. 13 Φ Signature Sequence no. 14 Φ Signature Sequence no. 15 Φ^2 Signature Sequence no. 1 Φ^2 Signature Sequence no. 2 Φ^2 Signature Sequence no. 3 Φ^2 Signature Sequence no. 4 Φ^2 Signature Sequence no. 5 Φ^2 Signature Sequence no. 6 φ Signature Sequence no. 7 φ Signature Sequence no. 8 φ Signature Sequence no. 9 φ Signature Sequence no. 10 φ Signature Sequence no. 11 φ Signature Sequence no. 12 φ Signature Sequence no. 13 φ Signature Sequence no. 14 φ Signature Sequence no. 15 Absent Residues no. 1 Absent Residues no. 2 Absent Residues no. 3 Absent Residues no. 4 Absent Residues no. 5 Absent Residues no. 6 Absent Residues no. 7 Absent Residues no. 8 Absent Residues no. 9 Absent Residues no. 10 Base Phi Representations: Base Phi Maximum Binary Binary Zeck Rep 0s Density no. 4 Binary Zeck Rep 0s Density no. 5 Binary Zeck Rep 0s Density no. 6 Binary Zeck Rep 0s Density no. 7 Complementary Beatty Sequences no. 14 Complementary Beatty Sequences no. 15 Fibonacci Binary no. 3 Fibonacci Entry Points no. 7 Fibonacci Entry Points no. 8 Fibonacci Entry Points no. 9 Fibonacci Entry Points no. 10 Fibonacci Entry Points no. 11 Fibonacci Entry Points no. 12 Fibonacci Entry Points no. 13 Fibonacci Entry Points no. 14 Fibonacci Rabbit Sequence no. 7 Fibonacci Sequence no. 14 Fibonacci Stolarsky Horizontal no. 11 Fibonacci Stolarsky Horizontal no. 12 Fibonacci Stolarsky Horizontal no. 13 Fibonacci Stolarsky Horizontal no. 14 Fibonacci Stolarsky Horizontal no. 15 Fibonacci Stolarsky Horizontal no. 16 Fibonacci Stolarsky Horizontal no. 17 Fibonacci Stolarsky Horizontal no. 18 Fibonacci Stolarsky Horizontal no. 19 Fibonacci Stolarsky Vertical no. 9 Fibonacci Stolarsky Vertical no. 10 Fibonacci Stolarsky Vertical no. 11 Fibonacci Stolarsky Vertical no. 12 Fibonacci Stolarsky Vertical no. 13 Fibonacci Stolarsky Vertical no. 14 Fibonacci Stolarsky Vertical no. 15 Fibonacci Stolarsky Vertical no. 16 Fibonacci Stolarsky Vertical no. 17 Fibonacci Stolarsky Vertical no. 18 Fibonacci Stolarsky Vertical no. 19 Fibonacci Stolarsky Vertical no. 20 Fibonacci Stolarsky Vertical no. 21 Fibonacci Transform A no. 1 Fibonacci Transform A no. 2 Fibonacci Transform A no. 3 Fibonacci Transform A no. 4 Fibonacci Transform A no. 5 Fibonacci Transform B no. 1 Fibonacci Transform B no. 2 Fibonacci Transform B no. 3 Fibonacci Transform B no. 4 Fibonacci Transform B no. 5 Golden Ratio no. 20 Golden Ratio no. 21 Golden Ratio no. 22 Golden Ratio no. 23 Horizontal Para-Fibonacci Sequence no. 14 Horizontal Para-Fibonacci Sequence no. 15 Horizontal Para-Fibonacci Sequence no. 16 Horizontal Para-Fibonacci Sequence no. 17 Horizontal Para-Fibonacci Sequence no. 18 Horizontal Para-Fibonacci Sequence no. 19 Horizontal Para-Fibonacci Sequence no. 20 Lucas Transform A no. 1 Lucas Transform A no. 2 Lucas Transform A no. 3 Lucas Transform A no. 4 Max Binary Fibonacci Rep 0s Density no. 1 Max Binary Fibonacci Rep 0s Density no. 2 Max Binary Fibonacci Rep 0s Density no. 3 Max Binary Fibonacci Rep 0s Density no. 4 Max Binary Fibonacci Rep 0s Density no. 5 Max Binary Fibonacci Rep 0s Density no. 6 Max Binary Fibonacci Rep 0s Density no. 7 Max Binary Fibonacci Reps Density no. 1 Max Binary Fibonacci Reps Density no. 2 Max Binary Fibonacci Reps Density no. 3 Max Binary Fibonacci Reps Density no. 4 Max Binary Fibonacci Reps Density no. 5 Max Fibbit Running no. 5 Max Fibbit Running no. 6 Max Fibbit Running no. 7 Max Fibbit Running no. 8 Max Fibbit Running no. 9 Min Fibbit Running no. 6 Min Fibbit Running no. 7 Min Fibbit Running no. 8 Min Fibbit Running no. 9 Min Fibbit Running no. 10 Min Fibbit Running no. 11 Min Fibbit Running no. 12 Pisano Periods no. 8 Pisano Periods no. 9 Pisano Periods no. 10 Pisano Periods no. 11 Pisano Periods no. 12 Pisano Periods no. 13 Pisano Periods no. 14 Pisano Periods no. 15 Q(n) Rep Sequence no. 9 Q(n) Rep Sequence no. 10 Q(n) Rep Sequence no. 11 Q(n) Rep Sequence no. 12 Q(n) Rep Sequence no. 13 R(n) Rep Sequence no. 9 R(n) Rep Sequence no. 10 R(n) Rep Sequence no. 11 R(n) Rep Sequence no. 12 R(n) Rep Sequence no. 13 Reciprocal Fibonacci Constant no. 3 Reciprocal Lucas Constant no. 3 Reciprocal Lucas Constant no. 4 S(n) Rep Sequence no. 11 S(n) Rep Sequence no. 12 S(n) Rep Sequence no. 13 S(n) Rep Sequence no. 14 S(n) Rep Sequence no. 15 S(n) Rep Sequence no. 16 S(n) Rep Sequence no. 17 Sequence A026242 no. 1 Sequence A026242 no. 2 Sequence A026242 no. 3 Sequence A026242 no. 4 Sequence A026242 no. 5 Sequence A026272 no. 9 Sequence A026272 no. 10 Sequence A026272 no. 11 Sequence A026272 no. 12 Sequence A026272 no. 13 Sequence A026272 no. 14 Sequence A117407 no. 1 Sequence A117407 no. 2 Sequence A117407 no. 3 Sequence A117407 no. 4 Sequence A117407 no. 5 Sequence A117407 no. 6 T(n) Rep Sequence no. 10 T(n) Rep Sequence no. 11 T(n) Rep Sequence no. 12 T(n) Rep Sequence no. 13 T(n) Rep Sequence no. 14 U(n) Rep Sequence no. 3 U(n) Rep Sequence no. 4 U(n) Rep Sequence no. 5 Unique Residues no. 3 Unique Residues no. 4 Unique Residues no. 5 Unique Residues no. 6 Unique Residues no. 7 Unique Residues no. 8 Unique Residues no. 9 Unique Residues no. 10 V(n) Rep Sequence no. 4 V(n) Rep Sequence no. 5 Vertical Para-Fibonacci Sequence no. 18 Vertical Para-Fibonacci Sequence no. 19 Vertical Para-Fibonacci Sequence no. 20 Vertical Para-Fibonacci Sequence no. 21 Vertical Para-Fibonacci Sequence no. 22 Vertical Para-Fibonacci Sequence no. 23 Vertical Para-Fibonacci Sequence no. 24 Vertical Para-Fibonacci Sequence no. 25 W(n) Rep Sequence no. 4 W(n) Rep Sequence no. 5 X(n) Rep Sequence no. 4 Y(n) Rep Sequence no. 1 Y(n) Rep Sequence no. 2 Y(n) Rep Sequence no. 3 Y(n) Rep Sequence no. 4 Z(n) Rep Sequence no. 1 Z(n) Rep Sequence no. 2 Z(n) Rep Sequence no. 3 Z(n) Rep Sequence no. 4 Zeck Reps Density no. 5 Zeck Reps Density no. 6 Zeck Reps Density no. 7 Zeck Reps Density no. 8 Zeck Reps Density no. 9 Zeck Reps Density no. 10 Zeckendorf Representations no. 12 Zeckendorf Representations no. 13 Zeckendorf Representations no. 14 Zeckendorf Voids no. 6 Zeckendorf Voids no. 7 Back to Index

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