Lattice-ordered algebras admitting a polynomial growth continuous function calculus
Abstract
We characterize the Archimedean lattice-ordered algebras with identity that admit a polynomial growth continuous function calculus. More precisely, for an -tuple in an Archimedean lattice-ordered algebra with identity , we prove that the existence of a lattice-algebra homomorphism from the algebra of continuous functions on of polynomial growth, sending the coordinate projections to and the constant function to , is equivalent to the existence of and an -subalgebra of such that and, for every , the norm is complete on . This result may be viewed as an analogue, for lattice-ordered algebras, of the characterization of positively homogeneous continuous function calculus for Archimedean vector lattices due to Laustsen and Troitsky. As a by-product, we describe the finitely generated free objects in the category of uniformly complete Archimedean -algebras and also show that the existence of a nontrivial polynomial growth continuous function calculus on a vector space forces it to be a commutative -algebra.
Cite
@article{arxiv.2604.20294,
title = {Lattice-ordered algebras admitting a polynomial growth continuous function calculus},
author = {David Muñoz-Lahoz},
journal= {arXiv preprint arXiv:2604.20294},
year = {2026}
}