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csong@2
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1 # This python file is a collection of basic functions that are used in the syncopation models.
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2
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3 import math
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4
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5 # The concatenation function is used to concatenate two sequences.
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6 def concatenate(seq1,seq2):
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7 return seq1+seq2
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8
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9 # The repetition function is to concatenate a sequence to itself for 'times' number of times.
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10 def repeat(seq,times):
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11 new_seq = list(seq)
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12 if times >= 1:
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13 for i in range(times-1):
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14 new_seq = concatenate(new_seq,seq)
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15 else:
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16 #print 'Error: repetition times needs to be no less than 1.'
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17 new_seq = []
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18 return new_seq
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19
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20 # The subdivision function is to equally subdivide a sequence into 'divisor' number of segments.
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21 def subdivide(seq,divisor):
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22 subSeq = []
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23 if len(seq) % divisor != 0:
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24 print 'Error: rhythmic sequence cannot be equally subdivided.'
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25 else:
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26 n = len(seq) / divisor
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27 start , end = 0, n
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28 for i in range(divisor):
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29 subSeq.append(seq[start : end])
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30 start = end
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31 end = end + n
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32 return subSeq
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33
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34
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35 # The ceiling function is to round each number inside a sequence up to its nearest integer.
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36 def ceiling(seq):
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37 seq_ceil = []
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38 for s in seq:
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39 seq_ceil.append(int(math.ceil(s)))
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40 return seq_ceil
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41
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42 # The find_divisor function returns a list of all possible divisors for a length of sequence.
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43 def find_divisor(number):
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44 divisors = [1]
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45 for i in range(2,number+1):
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46 if number%i ==0:
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47 divisors.append(i)
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48 return divisors
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49
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50 # The find_divisor function returns a list of all possible divisors for a length of sequence.
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51 def find_prime_factors(number):
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csong@20
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52 primeFactors = find_divisor(number)
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53
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54 # remove 1 because 1 is not prime number
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55 del primeFactors[0]
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56
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57 # reversely traverse all the divisors list and once find a non-prime then delete
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58 for i in range(len(primeFactors)-1,0,-1):
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59 # print primeFactors[i], is_prime(primeFactors[i])
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60 if not is_prime(primeFactors[i]):
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61 del primeFactors[i]
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62
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63 return primeFactors
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64
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65 def is_prime(number):
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66 isPrime = True
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67 # 0 or 1 is not prime numbers
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68 if number < 2:
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69 isPrime = False
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70 # 2 is the only even prime number
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71 elif number == 2:
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72 pass
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73 # all the other even numbers are non-prime
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74 elif number % 2 == 0:
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75 isPrime = False
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76 else:
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77 for odd in range(3, int(math.sqrt(number) + 1), 2):
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78 if number % odd == 0:
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79 isPrime = False
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80 return isPrime
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csong@2
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81
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82 # upsample a velocity sequence to certain length, e.g. [1,1] to [1,0,0,0,1,0,0,0]
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83 def upsample_velocity_sequence(velocitySequence, length):
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csong@28
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84 upsampledVelocitySequence = None
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85 if length%len(velocitySequence) != 0:
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86 print 'Error: the velocity sequence can only be upsampled to the interger times of its length.'
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87 else:
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88 upsampledVelocitySequence = [0]*length
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89 scalingFactor = length/len(velocitySequence)
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90 for index in range(len(velocitySequence)):
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91 upsampledVelocitySequence[index*scalingFactor] = velocitySequence[index]
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92 return upsampledVelocitySequence
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93
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94
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95 # convert a velocity sequence to its minimum time-span representation
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96 def velocity_sequence_to_min_timespan(velocitySequence):
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christopher@29
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97 from music_objects import VelocitySequence
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98 minTimeSpanVelocitySeq = [1]
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99 for divisors in find_divisor(len(velocitySequence)):
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100 segments = subdivide(velocitySequence,divisors)
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101 if len(segments)!=0:
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102 del minTimeSpanVelocitySeq[:]
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103 for s in segments:
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104 minTimeSpanVelocitySeq.append(s[0])
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105 if sum(minTimeSpanVelocitySeq) == sum(velocitySequence):
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106 break
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107 return VelocitySequence(minTimeSpanVelocitySeq)
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108
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christopher@29
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109 """
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110 # convert a note sequence to its minimum time-span representation
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111 def note_sequence_to_min_timespan(noteSequence):
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112 from music_objects import note_sequence_to_velocity_sequence
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113 timeSpanTicks = len(note_sequence_to_velocity_sequence(noteSequence))
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114 # print timeSpanTicks
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115
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116 barBinaryArray = [0]*(timeSpanTicks+1)
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117 for note in noteSequence:
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118 # mark note_on event (i.e. startTime) and note_off event (i.e. endTime = startTime + duration) as 1 in the barBinaryArray
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119 barBinaryArray[note.startTime] = 1
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120 barBinaryArray[note.startTime + note.duration] = 1
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121
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122 # convert the barBinaryArray to its minimum time-span representation
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123 minBarBinaryArray = velocity_sequence_to_min_timetpan(barBinaryArray[:-1])
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124 print barBinaryArray
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125 print minBarBinaryArray
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126 delta_t = len(barBinaryArray)/len(minBarBinaryArray)
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127
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128 # scale the startTime and duration of each note by delta_t
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129 for note in noteSequence:
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130 note.startTime = note.startTime/delta_t
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131 note.duration = note.duration/delta_t
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132
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133 return noteSequence
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christopher@29
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134 """
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135
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136 # get_note_indices returns all the indices of all the notes in this velocity_sequence
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137 def get_note_indices(velocitySequence):
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138 noteIndices = []
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139
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140 for index in range(len(velocitySequence)):
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141 if velocitySequence[index] != 0:
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142 noteIndices.append(index)
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143
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144 return noteIndices
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145
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146
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147 # The get_H returns a sequence of metrical weight for a certain metrical level (horizontal),
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148 # given the sequence of metrical weights in a hierarchy (vertical) and a sequence of subdivisions.
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149 def get_H(weightSequence,subdivisionSequence, level):
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150 H = []
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151 #print len(weight_seq), len(subdivision_seq), level
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152 if (level <= len(subdivisionSequence)-1) and (level <= len(weightSequence)-1):
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153 if level == 0:
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154 H = repeat([weightSequence[0]],subdivisionSequence[0])
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155 else:
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156 H_pre = get_H(weightSequence,subdivisionSequence,level-1)
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157 for h in H_pre:
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158 H = concatenate(H, concatenate([h], repeat([weightSequence[level]],subdivisionSequence[level]-1)))
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159 else:
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160 print 'Error: a subdivision factor or metrical weight is not defined for the request metrical level.'
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161 return H
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162
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163
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164 def calculate_bar_ticks(numerator, denominator, ticksPerQuarter):
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165 return (numerator * ticksPerQuarter *4) / denominator
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166
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167
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168 def get_rhythm_category(velocitySequence, subdivisionSequence):
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169 '''
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170 The get_rhythm_category function is used to detect rhythm category: monorhythm or polyrhythm.
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171 For monorhythms, all prime factors of the length of minimum time-span representation of this sequence are
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172 elements of its subdivision_seq, otherwise it is polyrhythm;
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173 e.g. prime_factors of polyrhythm 100100101010 in 4/4 is [2,3] but subdivision_seq = [1,2,2] for 4/4
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174 '''
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175 rhythmCategory = 'mono'
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176 for f in find_prime_factors(len(velocity_sequence_to_min_timespan(velocitySequence))):
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177 if not (f in subdivisionSequence):
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178 rhythmCategory = 'poly'
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179 break
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180 return rhythmCategory
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181
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182
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183 def string_to_sequence(inputString):
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184 return map(int, inputString.split(','))
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185
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csong@19
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186 # # The get_subdivision_seq function returns the subdivision sequence of several common time-signatures defined by GTTM,
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csong@19
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187 # # or ask for the top three level of subdivision_seq manually set by the user.
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csong@19
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188 # def get_subdivision_seq(timesig, L_max):
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189 # subdivision_seq = []
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190
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191 # if timesig == '2/4' or timesig == '4/4':
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192 # subdivision_seq = [1,2,2]
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193 # elif timesig == '3/4' or timesig == '3/8':
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194 # subdivision_seq = [1,3,2]
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195 # elif timesig == '6/8':
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196 # subdivision_seq = [1,2,3]
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csong@19
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197 # elif timesig == '9/8':
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198 # subdivision_seq = [1,3,3]
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csong@19
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199 # elif timesig == '12/8':
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200 # subdivision_seq = [1,4,3]
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csong@19
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201 # elif timesig == '5/4' or timesig == '5/8':
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202 # subdivision_seq = [1,5,2]
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203 # elif timesig == '7/4' or timesig == '7/8':
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204 # subdivision_seq = [1,7,2]
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205 # elif timesig == '11/4' or timesig == '11/8':
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206 # subdivision_seq = [1,11,2]
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207 # else:
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csong@19
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208 # print 'Time-signature',timesig,'is undefined. Please indicate subdivision sequence for this requested time-signature, e.g. [1,2,2] for 4/4 meter.'
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csong@19
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209 # for i in range(3):
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210 # s = int(input('Enter the subdivision factor at metrical level '+str(i)+':'))
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211 # subdivision_seq.append(s)
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212
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213 # if L_max > 2:
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214 # subdivision_seq = subdivision_seq + [2]*(L_max-2)
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csong@19
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215 # else:
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216 # subdivision_seq = subdivision_seq[0:L_max+1]
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217
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218 # return subdivision_seq
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219
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