English

Composition in Modulus Maps on Semigroups of Continuous Functions

Functional Analysis 2019-10-22 v1

Abstract

For locally compact Hausdorff spaces XX and YY, and function algebras AA and BB on XX and YY, respectively, surjections T:ABT:A \longrightarrow B satisfying norm multiplicative condition TfTgY=fgX\|Tf\, Tg\|_Y =\|fg\|_X, f,gAf,g\in A, with respect to the supremum norms, and those satisfying Tf+TgY=f+gX\||Tf|+|Tg|\|_Y=\||f|+|g|\|_X have been extensively studied. Motivated by this, we consider certain (multiplicative or additive) subsemigroups AA and BB of C0(X)C_0(X) and C0(Y)C_0(Y), respectively, and study surjections T:ABT: A \longrightarrow B satisfying the norm condition ρ(Tf,Tg)=ρ(f,g)\rho(Tf, Tg)=\rho(f,g), f,gAf,g \in A, for some class of two variable positive functions ρ\rho. It is shown that TT is also a composition in modulus map.

Keywords

Cite

@article{arxiv.1910.09216,
  title  = {Composition in Modulus Maps on Semigroups of Continuous Functions},
  author = {Bagher Jafarzadeh and Fereshteh Sady},
  journal= {arXiv preprint arXiv:1910.09216},
  year   = {2019}
}
R2 v1 2026-06-23T11:49:33.094Z