A Gleason-Kahane-\.Zelazko theorem for reproducing kernel Hilbert spaces

Abstract

We establish the following Hilbert-space analogue of the Gleason-Kahane-\.Zelazko theorem. If H is a reproducing kernel Hilbert space with a normalized complete Pick kernel, and if is a linear functional on H such that (1)=1 and (f)0 for all cyclic functions f∈H, then is multiplicative, in the sense that (fg)=(f)(g) for all f,g∈H such that fg∈H. Moreover is automatically continuous. We give examples to show that the theorem fails if the hypothesis of a complete Pick kernel is omitted. We also discuss conditions under which has to be a point evaluation.