When is a locally convex space Eberlein-Grothendieck?

Abstract

In this paper we undertake a systematic study of those locally convex spaces E such that (E, w) is (linearly) Eberlein-Grothendieck, where w is the weak topology of E. Let Ck(X) be the space of continuous real-valued functions on a Tychonoff space X endowed with the compact-open topology. The main results of our paper are: (1) For a first-countable space X (in particular, for a metrizable X) the locally convex space (Ck(X), w) is Eberlein-Grothendieck if and only if X is both σ-compact and locally compact; (2) (Ck(X), w) is linearly Eberlein-Grothendieck if and only if X is compact. We characterize E such that (E, w) is linearly Eberlein-Grothendieck for several other important classes of locally convex spaces E. Also, we show that the class of E for which (E, w) is linearly Eberlein-Grothendieck preserves linear continuous quotients. Various illustrating examples are provided.