Realizations of Unisingular Representations by Hyperelliptic Jacobians
Abstract
A representation of a finite group G on a finite dimensional vector space V is called unisingular if every g∈ G has 1 as an eigenvalue in its action on V. In this paper we show that certain unisingular representations can be realized as mod 2 representations of hyperelliptic Jacobians over . We additionally identify new unisingular representations of the symmetric and alternating groups.
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