Linear maps on Mn(R) preserving Schur stable matrices
Abstract
An n × n matrix A with real entries is said to be Schur stable if all the eigenvalues of A are inside the open unit disc. We investigate the structure of linear maps on Mn(R) that preserve the collection S of Schur stable matrices. We prove that if L is a linear map such that L(S) ⊂eq S, then (L) (the spectral radius of L) is at most 1 and when L(S) = S, we have (L) = 1. In the latter case, the map L preserves the spectral radius function and using this, we characterize such maps on both Mn(R) as well as on Sn.
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