Characterizations of nuclearity in Fréchet spaces

## 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__ (_

## 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

## Abstract We characterize tame pairs (__X__, __Y__) of Fréchet spaces where either __X__ or __Y__ is a power series space. For power series spaces of finite type, we get the well‐known conditions of (__DN__)‐(Ω) type. On the other hand, for power series spaces of infinite type, surprisingly, tame

## Abstract A Fréchet space __E__ is quasi‐reflexive if, either dim(__E__″/__E__) < ∞, or __E__″[__β__(__E__″,__E__′)]/__E__ is isomorphic to __ω__. A Fréchet space __E__ is totally quasi‐reflexive if every separated quotient is quasi‐reflexive. In this paper we show, using Schauder bases, that __E

## Abstract An operator __T__ ∈ __L__(__E, F__) __factors over G__ if __T__ = __RS__ for some __S__ ∈ __L__(__E, G__) and __R__ ∈ __L__(__G, F__); the set of such operators is denoted by __L__^__G__^(__E, F__). A triple (__E, G, F__) satisfies __bounded factorization property__ (shortly, (__E, G, F

A smoothing property (S 0 ) t for Fre chet spaces is introduced generalizing the classical concept of smoothing operators which are important in the proof of Nash Moser inverse function theorems. For Fre chet Hilbert spaces property (0) in standard form in the sense of D. Vogt is shown to be suffici