Abstract
The material of this paper depends upon the theory of locally convex spaces, sequence spaces and Schauder bases in topological vector spaces and as such we refer to [2] (cf. also [9]), [6] and [7] respectively for several unexpalined definitions, results and terms prevalent in the sequel.However, we do recall a few definitions and terms relevant to the present paper. So, we write thorughout for an arbitrary Hausdorff locally convex space (l.c.s.) with denoting the topological dual of X and representing the saturated collection of all T-continuous seminorms generating the locally convex (l.c) topology T on X.Also we write the pair of sequences for an arbitrary Schauder basis (S.b.) for X where and An S.b. for is called shrinking if is an S.b. for the strong dual being the usual canonical embedding from X into (Error rendering LaTeX formula)
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