Modular representations arising from self-dual -adic representations of finite groups

Abstract

Suppose is a prime number, Q is the field of -adic numbers, F is the finite field of elements, and d is a positive integer. Suppose G is a finite subgroup of a symplectic group Sp2d( Q). We prove that G can be embedded in Sp2d( F) in such a way that the characteristic polynomials are preserved (mod ), as long as >3.

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