Asymptotic Bounds for the Size of Hom(A, GLn(q))
Abstract
Fix an arbitrary finite group A of order a, and let X(n,q) denote the set of homomorphisms from A to the finite general linear group GLn(q). The size of X(n,q) is a polynomial in q. In this note it is shown that generically this polynomial has degree n2(1-a-1) - εr and leading coefficient mr, where εr and mr are constants depending only on r := n a. We also present an algorithm for explicitly determining these constants.
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