Exceptional sets in a product of harmonic spaces

Abstxact: Denote by s \*thy countable infinite topological product of real B-W. Pi, result of Anderson and K.le@ states tit whenever C i9 a comp& subset of s, then s \ C is haraeomorphic with s. In this note we show that, for products of more than countabfiy many reaI Irines the &uation is completeI

Assuming the continuum hypothesis we give an example of a completely regular space F without any dense finite-dimensional subspace whose square Fx F contains a dense zero-dimensional subspace; the construction is based on an example of a metrizable separable space H whose all uncountable subsets are

In order to prove fundamental assertions in several fields of mathematics (for instance in functional analysis and in optimization theory) i t is useful to have convenient separation theorems. The purpose of this paper is to give necessary conditions for convexity of sets in a product space which c