Composition in Modulus Maps on Semigroups of Continuous Functions

Abstract

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