Tensor products of Fréchet or (DF)-spaces with a Banach space

## Abstract Bierstedt and Bonet proved in 1988 that if a metrizable locally convex space __E__ satisfies the Heinrich's density condition, then every bounded set in the strong dual (__E__ ′, __β__ (__E__ ′, __E__)) of __E__ is metrizable; consequently __E__ is distinguished, i.e. (__E__ ′, __β__ (_

This paper deals with a new class of perfect FRECHET spaces which can be obtained by interpolation of echelon spaces: Zp,q[am,n]. We determine the reflexive, XONTXL, SCHWARTZ, totally reflexive, totally YONTEL and nuclear spaces Zp.q[am,n]. We also derive results on closed subspaces of the spaces (Z

## Preface. The class of quasi-normable locally convex spaces has been introduced by GROTHENDIECK [4]. Recently VALDIVIA [7] and BIERSTEDT, NEISE and SUMXERS [2], [3] independently gave a characterization of the quasirnormability of the FR~CRET-KOTHE spaces A(A) resp. P ( I , A ) in terms of the K