English

Banach actions preserving unconditional convergence

Functional Analysis 2022-02-08 v3

Abstract

Let A,X,YA,X,Y be Banach spaces and A×XYA\times X\to Y, (a,x)ax(a,x)\mapsto ax, be a continuous bilinear function, called a *Banach action*. We say that this action *preserves unconditional convergence* if for every bounded sequence (an)nω(a_n)_{n\in\omega} in AA and unconditionally convergent series nωxn\sum_{n\in\omega}x_n in XX the series nωanxn\sum_{n\in\omega}a_nx_n is unconditionally convergent. We prove that a Banach action A×XYA\times X\to Y preserves unconditional convergence if and only if for any linear functional yYy^*\in Y^* the operator Dy:XAD_{y^*}:X\to A^*, Dy(x)(a)=y(ax)D_{y^*}(x)(a)=y^*(ax), is absolutely summing. Combining this characterization with the famous Grothendieck theorem on the absolute summability of operators from 1\ell_1 to 2\ell_2, we prove that a Banach action A×XYA\times X\to Y preserves unconditional convergence if AA is a Hilbert space possessing an orthonormal basis (en)nω(e_n)_{n\in\omega} such that for every xXx\in X the series nωenx\sum_{n\in\omega}e_nx is weakly absolutely convergent. Applying known results of Garling on the absolute summability of diagonal operators between sequence spaces, we prove that for (finite or infinite) numbers p,q,r[1,]p,q,r\in[1,\infty] with 1r1p+1q\frac1r\le\frac1p+\frac1q, the coordinatewise multplication p×qr\ell_p\times\ell_q\to\ell_r preserves unconditional convergence if and only if one of the following conditions holds: (i) p2p\le 2 and qrq\le r, (ii) 2<p<qr2<p<q\le r, (iii) 2<p=q<r2<p=q<r, (iv) r=r=\infty, (v) 2q<pr2\le q<p\le r, (vi) q<2<pq<2<p and 1p+1q1r+12\frac1p+\frac1q\ge\frac1r+\frac12.

Keywords

Cite

@article{arxiv.2111.14253,
  title  = {Banach actions preserving unconditional convergence},
  author = {Taras Banakh and Vladimir Kadets},
  journal= {arXiv preprint arXiv:2111.14253},
  year   = {2022}
}

Comments

10 pages

R2 v1 2026-06-24T07:54:57.563Z