English

Complemented subspaces of polynomial ideals

Functional Analysis 2020-10-22 v1

Abstract

Given the polynomial ideal JP(nE;F)\mathcal{J}\circ\mathcal{P} (^{n}E; F), we prove that if JP(nE;F)\mathcal{J}\circ\mathcal{P} (^{n}E; F) contains an isomorphic copy of c0c_{0}, then JP(nE;F)\mathcal{J}\circ\mathcal{P} (^{n}E; F) is not complemented in P(nE;F)\mathcal{P} (^{n}E; F) for every closed operator ideal JLK\mathcal{J}\subset \mathcal{L}_{K} and every nNn\in\mathbb{N}. Likewise we show that if (JL)fac^(nE;F)\widehat{(\mathcal{J}\circ\mathcal{L})^{fac}}(^{n}E;F) contains an isomorphic copy of c0c_{0}, then (JL)fac^(nE;F)\widehat{(\mathcal{J}\circ\mathcal{L})^{fac}}(^{n}E;F) is not complemented in P(nE;F)\mathcal{P}(^{n}E; F) for every closed operator ideal JLK\mathcal{J}\subset \mathcal{L}_{K} and every n>1n>1. When J=LK\mathcal{J}=\mathcal{L}_{K}, these results generalizes results of several authors \cite{LEW},\cite{EM},\cite{KALTON},\cite{IOANA},\cite{SERGIO}, among others.

Cite

@article{arxiv.2010.10933,
  title  = {Complemented subspaces of polynomial ideals},
  author = {Sergio Andrés Pérez León},
  journal= {arXiv preprint arXiv:2010.10933},
  year   = {2020}
}

Comments

arXiv admin note: substantial text overlap with arXiv:1612.01742

R2 v1 2026-06-23T19:31:12.468Z