Finsler's Lemma for Matrix Polynomials
Abstract
Finsler's Lemma charactrizes all pairs of symmetric n × n real matrices A and B which satisfy the property that vT A v>0 for every nonzero v ∈ Rn such that vT B v=0. We extend this characterization to all symmetric matrices of real multivariate polynomials, but we need an additional assumption that B is negative semidefinite outside some ball. We also give two applications of this result to Noncommutative Real Algebraic Geometry which for n=1 reduce to the usual characterizations of positive polynomials on varieties and on compact sets.
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