English

Separating maps between commutative Banach algebras

Functional Analysis 2013-11-04 v2

Abstract

Let A\cal A and B\cal B be Banach algebras. A linear map T:ABT:{\cal A} \rightarrow {\cal B} is called separating or disjointness preserving if ab=0ab=0 implies Ta  Tb=0Ta\;Tb = 0 for all a,bAa,b\in {\cal A}. In this paper, we study a new class of regular Tauberian algebras and prove that some well-known Banach algebras in harmonic analysis belong to this class. We show that a bijective separating map between these algebras turns out to be continuous and the maximal ideal spaces of underlying algebras are homeomorphic. By imposing extra conditions on these algebras, we find a more thorough characterization of separating maps. The existence of a bijective separating map also leads to the existence of an algebraic isomorphism in some cases.

Keywords

Cite

@article{arxiv.1111.5922,
  title  = {Separating maps between commutative Banach algebras},
  author = {Mahmood Alaghmandan and Rasoul Nasr-Isfahani and Mehdi Nemati},
  journal= {arXiv preprint arXiv:1111.5922},
  year   = {2013}
}

Comments

Gradual improvements in the pervious version led to this version which covers all the results of the previous one while it studies commutative Banach algebras instead of just one specific class

R2 v1 2026-06-21T19:41:24.910Z