English

Characterizing Jordan embeddings between block upper-triangular subalgebras via preserving properties

Rings and Algebras 2024-10-22 v3

Abstract

Let MnM_n be the algebra of n×nn \times n complex matrices. We consider arbitrary subalgebras A\mathcal{A} of MnM_n which contain the algebra of all upper-triangular matrices (i.e.\ block upper-triangular subalgebras), and their Jordan embeddings. We first describe Jordan embeddings ϕ:AMn\phi : \mathcal{A} \to M_n as maps of the form ϕ(X)=TXT1\phi(X)=TXT^{-1} or ϕ(X)=TXtT1\phi(X)=TX^tT^{-1}, where TMnT\in M_n is an invertible matrix, and then we obtain a simple criteria of when one block upper-triangular subalgebra Jordan-embeds into another (and in that case we describe the form of such embeddings). As a main result, we characterize Jordan embeddings ϕ:AMn\phi : \mathcal{A} \to M_n (when n3n\geq 3) as continuous injective maps which preserve commutativity and spectrum. We show by counterexamples that all these assumptions are indispensable (unless A=Mn\mathcal{A} = M_n when injectivity is superfluous).

Keywords

Cite

@article{arxiv.2311.09864,
  title  = {Characterizing Jordan embeddings between block upper-triangular subalgebras via preserving properties},
  author = {Ilja Gogić and Tatjana Petek and Mateo Tomašević},
  journal= {arXiv preprint arXiv:2311.09864},
  year   = {2024}
}

Comments

23 pages

R2 v1 2026-06-28T13:23:21.612Z