Grothendieck's theorem on the precompactness of subsets functional spaces over pseudocompact spaces

Abstract

Generalizations of the theorems of Eberlein and Grothendieck on the precompactness of subsets of function spaces are considered: if X is a countably compact space and Cp(X) is a space of continuous functions in the pointwise topology convergence, then any countably compact subspace of the space Cp(X) is precompact, that is, it has a compact closure. The paper provides an overview of the results on this topic. It is proved that if a pseudo-compact X contains a dense Lindelof -space, then pseudocompact subspaces of the space Cp(X) are precompact. If X is the product Cech complete spaces, then bounded subsets of the space Cp(X) are precompact. Results on the continuity of separately continuous functions were also obtained.