K-Positivity Preservers and their Generators

Abstract

We study K-positivity preservers with given closed K⊂eqRn, i.e., linear maps T:R[x1,…,xn][x1,…,xn] such that TPos(K)⊂eqPos(K) holds, and their generators A:R[x1,…,xn][x1,…,xn], i.e., etAPos(K)⊂eqPos(K) holds for all t≥ 0. We characterize these maps T for any closed K⊂eqRn in Theorem 4.5. We characterize the maps A in Theorem 5.12 for K=Rn and give partial results for general K. In Proposition 6.1 and 6.3 we give maps A such that etA is a positivity preserver for all t≥ τ for some τ>0 but not for t∈ (0,τ), i.e., we have an eventually positive semi-group.

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