Weyl Tensors, Strongly Regular Graphs, Multiplicative Characters, and a Quadratic Matrix Equation
Abstract
We study solutions of a quadratic matrix equation arising in Riemannian geometry. Let S be a real symmetric n× n-matrix with zeros on the diagonal and let θ be a real number. We construct nonzero solutions (S,θ) of the set of quadratic equations \[ΣkSi,k=0 and ΣkSi,kSk,j+Si,j2=θ Si,j for i<j.\] Our solutions relate the equations to strongly regular graphs, to group rings, and to multiplicative characters of finite fields.
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