Weighted PLB-spaces of continuous functions arising as tensor products of a Fr\'echet and a DF-space

TL;DR

This paper explores the structure of certain weighted spaces of continuous functions, representing them as tensor products of a Fréchet and a DF-space, and links their properties to invariants of these spaces.

Contribution

It introduces a new representation of PLB-spaces as tensor products of a Fréchet and a DF-space using product weight sequences, extending previous analyses.

Findings

Representation of PLB-spaces as tensor products

Connection between invariants (DN) and ($\,Omega$) and space properties

Extension of locally convex property analysis

Abstract

Countable projective limits of countable inductive limits, so-called PLB-spaces, of weighted Banach spaces of continuous functions have recently been investigated by Agethen, Bierstedt and Bonet, who analyzed locally convex properties in terms of the defining double sequence of weights. We complement their results by considering a defining sequence which is the product of two single sequences. By associating these two sequences with a weighted Fr\'{e}chet, resp. LB-space of continuous functions or with two weighted Fr\'{e}chet spaces (by taking the reciprocal of one of the sequences) we derive a representation of the PLB-space as the tensor product of a Fr\'{e}chet and a DF-space and exhibit a connection between the invariants (DN) and ($\Omega$) for Fr\'{e}chet spaces and locally convex properties of the PLB-space resp. of the forementioned tensor product.