Localized strict topologies on multiplier algebras of pro-C*-algebras

Abstract

The bounded localization βb of a locally convex topology β is defined as the finest locally convex topology agreeing with β on all bounded sets. We show that the strict topology on the multiplier algebra of a bornological pro-C*-algebras equals its own localization, generalizing the analogous result due to Taylor for multiplier algebras of plain C*-algebras. We also (a) characterize the barreled commutative unital pro-C*-algebras as those of continuous functions on functionally Hausdorff spaces whose relatively pseudocompact subsets are relatively compact, equipped with the topology of uniform convergence on compact subsets, and (b) describe a contravariant equivalence between the category of commutative unital pro-C*-algebras and a category of Tychonoff (rather than functionally Hausdorff) topological spaces.