English

Continuous spectrum-shrinking maps between finite-dimensional algebras

Spectral Theory 2025-07-23 v3 Rings and Algebras

Abstract

Let A\mathcal{A} and B\mathcal{B} be unital finite-dimensional complex algebras, each equipped with the unique Hausdorff vector topology. Denote by Max(A)={M1,,Mp}\mathrm{Max}(\mathcal{A})=\{\mathcal{M}_1, \ldots, \mathcal{M}_p\} and Max(B)={N1,,Nq}\mathrm{Max}(\mathcal{B})=\{\mathcal{N}_1, \ldots, \mathcal{N}_q\} the sets of all maximal ideals of A\mathcal{A} and B\mathcal{B}, respectively. For each 1ip1 \leq i \leq p and 1jq1 \leq j \leq q define the quantities ki:=dim(A/Mi) and mj:=dim(B/Nj), k_i:=\sqrt{\dim(\mathcal{A}/\mathcal{M}_i)} \quad \text{ and } \quad m_j:=\sqrt{\dim(\mathcal{B}/\mathcal{N}_j)}, which are positive integers by Wedderburn's structure theorem. We show that there exists a continuous spectrum-shrinking map ϕ:AB\phi: \mathcal{A} \to \mathcal{B} (i.e. sp(ϕ(a))sp(a)\mathrm{sp}(\phi(a))\subseteq \mathrm{sp}(a) for all aAa \in \mathcal{A}) if and only if for each 1jq1\leq j \leq q the linear Diophantine equation k1x1j++kpxpj=mj k_1x_{1}^{j} + \cdots + k_px_{p}^j = m_j has a non-negative integer solution (x1j,,xpj)N0p(x_{1}^j,\ldots,x_{p}^j)\in \mathbb{N}_{0}^p. In a similar manner we also characterize the existence of continuous spectrum-preserving maps ϕ:AB\phi: \mathcal{A} \to \mathcal{B} (i.e. sp(ϕ(a))=sp(a)\mathrm{sp}(\phi(a))= \mathrm{sp}(a) for all aAa \in \mathcal{A}). Finally, we analyze conditions under which all continuous spectrum-shrinking maps ϕ:AB\phi: \mathcal{A} \to \mathcal{B} are automatically spectrum-preserving.

Keywords

Cite

@article{arxiv.2504.05841,
  title  = {Continuous spectrum-shrinking maps between finite-dimensional algebras},
  author = {Ilja Gogić and Mateo Tomašević},
  journal= {arXiv preprint arXiv:2504.05841},
  year   = {2025}
}

Comments

8 pages, updated version of Theorem 1.1 (corrected from previous submission), to appear in J. Algebra Appl

R2 v1 2026-06-28T22:50:35.642Z