E. Feizi, J. Soleymani
Published 2014-07-20Version 1
The aim of this article is to study a number of relationship between Frechet algebra $\mathcal{A}$ and its ultrapower $(\mathcal{A})_{\mathcal{U}}$. We give a characterization in some aspects such as locally bounded approximate identity. We consider the notion of contractibility of ultrapower of Frechet algebra, and we show that if $(\mathcal{A})_{\mathcal{U}}$ has approximation property with good ultrafilter $\mathcal{U}$ then $\mathcal{A}$ is contractible if and only if $(\mathcal{A})_{\mathcal{U}}$ is contractible.
On Banach spaces without the approximation property
Compactness and an approximation property related to an operator ideal
On the commutant of $B(H)$ in its ultrapower
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