Extreme flatness and Hahn-Banach type theorems for normed modules over c0

Abstract

Let A be a commutative normed algebra, K a class of normed A-modules. A normed A-module Z is called extremely flat with respect to K, if, for every isometric morphism of normed A-modules, belonging to K, the non-completed projective A-module tensor product of this morphism and the identity morphism on Z, is also isometric. In the present paper we take, in the capacity of A, the algebra c0 of vanishing sequences and consider the class of the so-called homogeneous modules, over the latter algebra, denoted by H. The main theorem gives a full description of essential homogeneous modules over the mentioned algebra that are extremely flat with respect to H. (In particular, all lp-sums; p<infinity of normed spaces of integrable functions on different measure spaces have the indicated property). As a corollary, some theorems of Hahn-Banach type, concerning extensions of c0-module morphisms with preservation of their norms, are obtained. (In particular, lp-sums of normed spaces of essentially bounded functions play, in the relevant context, the same role as the scalar field in the classical Hahn-Banach Theorem). Besides, the following related result is established. If I is a topologically injective morphism of normed c0-modules, then for every normed c0-module Z, the non-completed projective tensor product of I and the identity morphism on Z is also injective (despite it is, generally speaking, not topologically injective). If I is a (just) injective bounded morphism, then such a tensor product is not bound to be injective. Finally, it is shown that we can not omit the word "essential" in the formulation of the main theorem. Namely, the non-essential homogeneous c0-module of all bounded sequences is not extremely flat with respect to H.