Pascal's Triangles in Abelian and Hyperbolic Groups
Abstract
Pascal's triangle will give the number of geodesics from the identity to each point of Z2 if you write it in each of the quadrants. Given a group G and generating set G we take the Pascal's function p G: G Z 0 to be the function which assigns to each g∈ G the number of geodesics from 1 to g. We give a general method for calculating this in hyperbolic groups and discuss the generic case in abelian groups.
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