Uniform poly-log diameter bounds for some families of finite groups
Abstract
Fix a prime p and an integer m with p> m ≥ 2. Define the family of finite groups \[ Gn :=SLm (Z/pnZ) \] for n=1,2,... . We will prove that there exist two positive constants C and d such that for any n and any generating set S⊂eq Gn, \[ diam(Gn,S) ≤ C · logd (|Gn|)\] when diam (G,S) is the diameter of the finite group G with respect to the set of generators S. It is defined as the maximum over g ∈ G of the length of the shortest word in S S-1 representing g. This result shows that these families of finite groups have a poly-logarithmic bound on the diameter with respect to any set of generators. The proof of this result also provides a efficient algorithm for finding such a poly-logarithmic representation of any element. In addition it shows that the power d in the log bound can be arbitrary close to 3 for m=2 and arbitrary close to 4 for m>2.
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