1. Flat cyclic Fréchet modules, amenable Fréchet algebras, and approximate identities
- Author
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A. Yu. Pirkovskii
- Subjects
amenable Fréchet algebra ,Pure mathematics ,46H25 ,approximate diagonal ,18G50 ,Mathematics (miscellaneous) ,Corollary ,Ideal (order theory) ,Algebra over a field ,Fréchet algebra ,Commutative property ,Mathematics ,Discrete mathematics ,Mathematics::Functional Analysis ,quasinormable Fréchet space ,46M10 ,16D40 ,Flat Fréchet module ,46M18 ,locally $m$-convex algebra ,46A45 ,cyclic Fréchet module ,Bounded function ,approximate identity ,Inverse limit ,Köthe space ,Approximate identity - Abstract
Let A be a locally $m$-convex Fréchet algebra. We give a necessary and sufficient condition for a cyclic Fréchet $A-$module $X=A+/I$ to be strictly flat, generalizing thereby a criterion of Helemskii and Sheinberg. To this end, we introduce a notion of "locally bounded approximate identity" (a locally b.a.i. for short), and we show that $X$ is strictly flat if and only if the ideal I has a right locally b.a.i. Next we apply this result to amenable algebras and show that a locally $m$-convex Fréchet algebra $A$ is amenable if and only if $A$ is isomorphic to a reduced inverse limit of amenable Banach algebras. We also extend a number of characterizations of amenability obtained by Johnson and by Helemskii and Sheinberg to the setting of locally $m$-convex Fréchet algebras. As a corollary, we show that Connes and Haagerup's theorem on amenable $C*$-algebras and Sheinberg's theorem on amenable uniform algebras hold in the Fréchet algebra case. We also show that a quasinormable locally $m$-convex Fréchet algebra has a locally b.a.i. if and only if it has a b.a.i. On the other hand, we give an example of a commutative, locally $m$-convex Fréchet-Montel algebra which has a locally b.a.i., but does not have a b.a.i.
- Published
- 2009
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