English

Archimedean classes of matrices over ordered fields

Rings and Algebras 2018-04-24 v2

Abstract

Let (F,)(F,\le) be an ordered field and let A,BA,B be square matrices over FF of the same size. We say that AA and BB belong to the same archimedean class if there exists an integer rr such that the matrices rATABTBr A^T A-B^T B and rBTBATAr B^T B-A^T A are positive semidefinite with respect to \le. We show that this is true if and only if A=CBA=CB for some invertible matrix CC such that all entries of CC and C1C^{-1} are bounded by some integer. We also show that every archimedean class contains a row echelon form and that its shape and archimedean classes (in FF) of its pivots are uniquely determined. For matrices over fields of formal Laurent series we construct a canonical representative in each archimedean class. The set of all archimedean classes is shown to have a natural lattice structure while the semigroup structure does not come from matrix multiplication. Our motivation comes from noncommutative real algebraic geometry and noncommutative valuation theory.

Keywords

Cite

@article{arxiv.1503.04346,
  title  = {Archimedean classes of matrices over ordered fields},
  author = {Jaka Cimpric},
  journal= {arXiv preprint arXiv:1503.04346},
  year   = {2018}
}

Comments

15 pages, submitted

R2 v1 2026-06-22T08:53:08.567Z