Linear continuous operators with bounded supports

Abstract

For any Tychonoff space X let D(X) be either the set C(X) of all continuous functions on X or the set C*(X) of all bounded continuous functions on X. When D(X) is endowed with the point convergence topology, we write Dp(X). Zakrzewski [Theorem 3.12]kz proved that if X and Y are σ-compact spaces and there is a continuous linear map T:Cp(X) Cp(Y) such that T(Cp(X)) is dense in Cp(Y) and |(y)|≤ m for every y∈ Y, then Y≤ m· X+m+m!-1. Here, (y) denotes the support of the linear continuous map ly:Cp(X) R, defined by ly(f)=T(f)(y). In the present paper we improve the last inequality by showing that Y≤ m· X provided X,Y are Tychonoff spaces and there is a continuous linear surjection T:Dp(X) Dp(Y) with |(y)|≤ m for every y∈ Y. This implies the following generalization of [Theorem 1.4]ev: If T:Dp(X) Dp(Y) is a continuous linear surjection with X,Y Tychonoff spaces and X=0, then Y=0. Our proofs are obtained by refining the techniques developed in ev.