# Quantifying (non-)weak compactness of operators on $AL$- and $C(K)$-spaces

**Authors:** Antonio Acuaviva, Amir Bahman Nasseri

arXiv: 2508.21543 · 2026-03-30

## TL;DR

This paper investigates the structure of non-weakly compact operators on $AL$- and $C(K)$-spaces, establishing unique algebra norms and characterizations of weak essential norms through duality and factorization techniques.

## Contribution

It introduces new characterizations of weak essential norms, proves the uniqueness of algebra norms on weak Calkin algebras, and extends results to $C(L)$-spaces with extremally disconnected $L$.

## Key findings

- Every operator admits a best weakly compact approximant.
- Weak essential norm coincides with residuum norm and De Blasi measure for $L_ty[0,1]$.
- Weak Calkin algebra admits a unique algebra norm for every $AL$-space.

## Abstract

We study the representation of non-weakly compact operators between $AL$-spaces. In this setting, we show that every operator admits a best approximant in the ideal of weakly compact operators. Using duality arguments, we extend this result to operators between $C(L)$-spaces where $L$ is extremally disconnected. We also characterize the weak essential norm for operators between $AL$-spaces in terms of factorizations of the identity on $\ell_1$. As a consequence, we deduce that the weak Calkin algebra $\mathscr{B}(E)/\mathscr{W}(E)$ admits a unique algebra norm for every $AL$-space $E$. By duality, similar results are obtained for $C(K)$-spaces. In particular, we prove that for operators $T: L_{\infty}[0,1] \to L_{\infty}[0,1]$ the weak essential norm, the residuum norm, and the De Blasi measure of weak compactness coincide, answering a question of Gonz\'alez, Saksman and Tylli.

## Full text

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## References

44 references — full list in the complete paper: https://tomesphere.com/paper/2508.21543/full.md

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Source: https://tomesphere.com/paper/2508.21543