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I want to find the set of the minimal, indecomposable, words in generators. For this purpose, I try to utilize the Cayley graph as follows: consider the Cayley graph of the group, w.r.t. the generators. Now, the minimal cycles in the graph are exactly the minimal, indecomposable, words in generators (i.e. power product experssions).
I wonder whether I can do the above job with the help of GRAPE?
Regards,
Zhao
The text was updated successfully, but these errors were encountered:
I want to find the set of the minimal, indecomposable, words in generators. For this purpose, I try to utilize the Cayley graph as follows: consider the Cayley graph of the group, w.r.t. the generators. Now, the minimal cycles in the graph are exactly the minimal, indecomposable, words in generators (i.e. power product experssions).
I wonder whether I can do the above job with the help of GRAPE?
Regards,
Zhao
The text was updated successfully, but these errors were encountered: