Z. Ercan, Middle East Technical University, Department of Mathematics, 065 31 Ankara, Turkey, e-mail: zercan@metu.edu.tr
Abstract: M. Radulescu proved the following result: Let $X$ be a compact Hausdorff topological space and ${\pi } C(X)\rightarrow C(X)$ a supra-additive and supra-multiplicative operator. Then ${\pi }$ is linear and multiplicative. We generalize this result to arbitrary topological spaces.
Keywords: $C(X)$-space, supra-additive, supra-multiplicative operator, realcompact
Classification (MSC2000): 46J10, 46E25
Full text of the article: