Hello,
The next Banach spaces webinar is on Friday July 2 at 9AM Central time. Please join us at
https://unt.zoom.us/j/83807914306
Title: Closed ideals in the algebra of compact-by-approximable operators
Speaker. Henrik Johannes Wirzenius (University of Helsinki)
Abstract: In this talk I will present various examples of non-trivial closed ideals of the compact-by-approximable quotient algebra $\mathfrak A_X=\mathcal K(X)/\mathcal A(X)$ on Banach spaces $X$ failing the approximation property. Here $\mathcal K(X)$ denotes the algebra of compact operators $X\to X$ and $\mathcal A(X)=\overline{\mathcal F(X)}$ is the uniform norm closure of the bounded finite rank operators $\mathcal F(X)$.
The examples include:
(i) If $X$ has cotype 2, $Y$ has type 2, $\mathfrak A_X\neq{0}$ and $\mathfrak A_Y\neq{0}$, then $\mathfrak A_{X\oplus Y}$ has at least 2 (and in some cases up to 8) closed ideals.
(ii) For all $4\lt p\lt \infty$ there are closed subspaces $X\subset\ell^p$ and $X\subset c_0$ such that $\mathfrak A_X$ has a non-trivial closed ideal.
(iii) A Banach space $Z$ such that $\mathfrak A_Z$ contains an uncountable lattice of closed ideals.
The talk is based on a recent preprint [arXiv:2105.08403] together with Hans-Olav Tylli (University of Helsinki).
For more information about the past and future talks, and videos please visit the webinar website http://www.math.unt.edu/~bunyamin/banach
Thank you, and best regards,
Bunyamin Sari