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# Calculating a nilpotent quotient # Nilpotency class: 11 # Size of exponents: 8 bytes # # Calculating the abelian quotient ... # The abelian quotient has 2 generators # with the following exponents: 0 0 # # Calculating the class 2 quotient ... ## Sizes: 2 3 # Layer 2 of the lower central series has 1 generators # with the following exponents: 0 # # Calculating the class 3 quotient ... ## Sizes: 2 3 5 # Maximal entry: 0 # Layer 3 of the lower central series has 1 generators # with the following exponents: 0 # # Calculating the class 4 quotient ... ## Sizes: 2 3 4 7 # Maximal entry: 0 # Layer 4 of the lower central series has 1 generators # with the following exponents: 0 # # Calculating the class 5 quotient ... ## Sizes: 2 3 4 5 9 # Maximal entry: 0 # Layer 5 of the lower central series has 1 generators # with the following exponents: 0 # # Calculating the class 6 quotient ... ## Sizes: 2 3 4 5 6 11 # Maximal entry: 0 # Layer 6 of the lower central series has 1 generators # with the following exponents: 2 # # Calculating the class 7 quotient ... ## Sizes: 2 3 4 5 6 7 14 # Maximal entry: 0 # Layer 7 of the lower central series has 2 generators # with the following exponents: 2 2 # # Calculating the class 8 quotient ... ## Sizes: 2 3 4 5 6 7 9 20 # Maximal entry: 2 # Layer 8 of the lower central series has 2 generators # with the following exponents: 2 2 # # Calculating the class 9 quotient ... ## Sizes: 2 3 4 5 6 7 9 11 26 # Maximal entry: 4 # Layer 9 of the lower central series has 2 generators # with the following exponents: 2 2 # # Calculating the class 10 quotient ... ## Sizes: 2 3 4 5 6 7 9 11 13 32 # Maximal entry: 4 # Layer 10 of the lower central series has 1 generators # with the following exponents: 2 # # Calculating the class 11 quotient ... ## Sizes: 2 3 4 5 6 7 9 11 13 14 35 # Integer matrix is the identity. # Maximal entry: 5 # The epimorphism : # e1 |---> A # e2 |---> B # The nilpotent quotient : <A,B,C,D,E,F,G,H,I,J,K,L,M,N |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lass : 10 # Nr of generators of each class : 2 1 1 1 1 1 2 2 2 1 # The definitions: # C := [ B, A ] # D := [ B, A, B ] # E := [ B, A, B, B ] # F := [ B, A, B, B, A ] # G := [ B, A, B, B, A, B ] # H := [ B, A, B, B, A, B, A ] # I := [ B, A, B, B, A, B, B ] # J := [ B, A, B, B, A, B, A, B ] # K := [ B, A, B, B, A, B, B, A ] # L := [ B, A, B, B, A, B, A, B, A ] # M := [ B, A, B, B, A, B, B, A, B ] # N := [ B, A, B, B, A, B, A, B, A, B ] [ Dauer der Verarbeitung: 0.22 Sekunden (vorverarbeitet) ] |
2026-03-28