English

Concerning $q$-summable Szlenk index

Functional Analysis 2018-01-03 v1

Abstract

For each ordinal ξ\xi and each 1q<1\leqslant q<\infty, we define the notion of ξ\xi-qq-summable Szlenk index. When ξ=0\xi=0 and q=1q=1, this recovers the usual notion of summable Szlenk index. We define for an arbitrary weak^*-compact set a transfinite, asymptotic analogue αξ,p\alpha_{\xi,p} of the martingale type norm of an operator. We prove that this quantity is determined by norming sets and determines ξ\xi-Szlenk power type and ξ\xi-qq-summability of Szlenk index. This fact allows us to prove that the behavior of operators under the αξ,p\alpha_{\xi,p} seminorms passes in the strongest way to injective tensor products of Banach spaces. Furthermore, we combine this fact with a result of Schlumprecht to prove that a separable Banach space with good behavior with respect to the αξ,p\alpha_{\xi,p} seminorm can be embedded into a Banach space with a shrinking basis and the same behavior under αξ,p\alpha_{\xi,p}, and in particular it can be embedded into a Banach space with a shrinking basis and the same ξ\xi-Szlenk power type. Finally, we completely elucidate the behavior of the αξ,p\alpha_{\xi,p} seminorms under r\ell_r direct sums. This allows us to give an alternative proof of a result of Brooker regarding Szlenk indices of p\ell_p and c0c_0 direct sums of operators.

Keywords

Cite

@article{arxiv.1801.00033,
  title  = {Concerning $q$-summable Szlenk index},
  author = {Ryan M. Causey},
  journal= {arXiv preprint arXiv:1801.00033},
  year   = {2018}
}
R2 v1 2026-06-22T23:32:36.287Z