Non-commutative separate continuity and weakly almost periodicity for Hopf von Neumann algebras

TL;DR

This paper develops a non-commutative framework for separate continuity and weakly almost periodic functions within Hopf von Neumann algebras, introducing new algebraic structures and compactification concepts.

Contribution

It defines a non-commutative notion of separate continuity, constructs the greatest $C^*$-subalgebra of weakly almost periodic elements, and introduces quantum semitopological semigroups.

Findings

Existence of a greatest $C^*$-subalgebra within weakly almost periodic elements.

Development of a non-commutative notion of separate continuity.

Introduction of quantum semitopological semigroup concepts.

Abstract

For a compact Hausdorff space $X$, the space $SC(X\times X)$ of separately continuous complex valued functions on $X$ can be viewed as a $C^*$-subalgebra of $C(X)^{**}\overline\otimes C(X)^{**}$, namely those elements which slice into $C(X)$. The analogous definition for a non-commutative $C^*$-algebra does not necessarily give an algebra, but we show that there is always a greatest $C^*$-subalgebra. This thus gives a non-commutative notion of separate continuity. The tools involved are multiplier algebras and row/column spaces, familiar from the theory of Operator Spaces. We make some study of morphisms and inclusions. There is a tight connection between separate continuity and the theory of weakly almost periodic functions on (semi)groups. We use our non-commutative tools to show that the collection of weakly almost periodic elements of a Hopf von Neumann algebra, while itself perhaps not a $C^*$-algebra, does always contain a greatest $C^*$-subalgebra. This allows us to give a notion of non-commutative, or quantum, semitopological semigroup, and to briefly develop a compactification theory in this context.