On average orders of automorphism groups of bilinear maps over finite fields
Abstract
Let :V× V W be a bilinear map of finite vector spaces V and W over a finite field Fq. We present asymptotic bounds on the number of isomorphism classes of bilinear maps under the natural action of GL(V) and GL(W), when (V) and (W) are linearly related. As motivations and applications of the results, we present almost tight upper bounds on the number of p-groups of Frattini class 2 as first studied by Higman (Proc. Lond. Math. Soc., 1960). Such bounds lead to answers for some open questions by Blackburn, Neumann, and Venkataraman (Cambridge Tracts in Mathematics, 2007). Further applications include sampling matrix spaces with the trivial automorphism group, and asymptotic bounds on the number of isomorphism classes of finite cube-zero commutative algebras.
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