Invertible positive maps that are not automorphism
Abstract
Let X be a real normed vector space with a cone K⊂eq X satisfying either (i) K is closed with non-empty interior or (ii) K has non-zero extremals or (iii) K is closed and X is a Banach space. In this short note, we provide a method to construct an invertible linear map T X X such that T[K]⊂eq K but T-1[K]⊂eq~K. In particular, we show that, for every cone automorphism S X X, there exists a rank one perturbation of S which is positive and invertible, but does not have a positive inverse. We provide examples from four diverse situations.
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