Logarithmic bounds for the diameters of some Cayley graphs
Abstract
Let S⊂GLn( Z) be a finite symmetric set. We show that if the Zariski closure of = S is a product of SLd or a special affine linear group, then the diameter of the Cayley graph Cay(/(q),πq(S)) is O( q), where q is an arbitrary positive integer, πq: /(q) is the canonical projection induced by the reduction modulo q, and the implied constant depends only on S.
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