Additive Local Multiplications and zero-preserving maps on C(X)

Abstract

Suppose X is a compact Hausdorff space. In terms of topolocical properties of X, we find topological conditions on X that are equivalent to each of the following: 1. every additive local multiplication on C( X) is a multiplication, 2. every additive local multiplication on CR( X) is a multiplication, and 3. every additive map on C( X) that is zero-preserving (i.e., f( x) =0 implies ( Tf) ( x) =0) has the form T( f) =T( 1) Ref+T( i) Imf.