Continuous spectrum-shrinking maps between finite-dimensional algebras

Abstract

Let A and B be unital finite-dimensional complex algebras, each equipped with the unique Hausdorff vector topology. Denote by Max(A)=\M1, …, Mp\ and Max(B)=\N1, …, Nq\ the sets of all maximal ideals of A and B, respectively. For each 1 ≤ i ≤ p and 1 ≤ j ≤ q define the quantities ki:=(A/Mi) and mj:=(B/Nj), which are positive integers by Wedderburn's structure theorem. We show that there exists a continuous spectrum-shrinking map φ: A B (i.e. sp(φ(a))⊂eq sp(a) for all a ∈ A) if and only if for each 1≤ j ≤ q the linear Diophantine equation k1x1j + ·s + kpxpj = mj has a non-negative integer solution (x1j,…,xpj)∈ N0p. In a similar manner we also characterize the existence of continuous spectrum-preserving maps φ: A B (i.e. sp(φ(a))= sp(a) for all a ∈ A). Finally, we analyze conditions under which all continuous spectrum-shrinking maps φ: A B are automatically spectrum-preserving.

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