Metrizable TAP, HTAP and STAP groups

Abstract

In a recent paper by D. Shakhmatov and J. Spev\'ak [Group-valued continuous functions with the topology of pointwise convergence, Topology and its Applications (2009), doi:10.1016/j.topol.2009.06.022] the concept of a TAP group is introduced and it is shown in particular that NSS groups are TAP. We prove that conversely, Weil complete metrizable TAP groups are NSS. We define also the narrower class of STAP groups, show that the NSS groups are in fact STAP and that the converse statement is true in metrizable case. A remarkable characterization of pseudocompact spaces obtained in the paper by D. Shakhmatov and J. Spev\'ak asserts: a Tychonoff space X is pseudocompact if and only if Cp(X, R) has the TAP property. We show that for no infinite Tychonoff space X, the group Cp(X, R) has the STAP property. We also show that a metrizable locally balanced topological vector group is STAP iff it does not contain a subgroup topologically isomorphic to Z( N).