English

Complementations in $C(K,X)$ and $\ell_\infty(X)$

Functional Analysis 2021-04-16 v1

Abstract

We investigate the geometry of C(K,X)C(K,X) and (X)\ell_{\infty}(X) spaces through complemented subspaces of the form (iΓXi)c0\left(\bigoplus_{i\in \varGamma}X_i\right)_{c_0}. Concerning the geometry of C(K,X)C(K,X) spaces we extend some results of D. Alspach and E. M. Galego from \cite{AlspachGalego}. On \ell_{\infty}-sums of Banach spaces we prove that if (X)\ell_{\infty}(X) has a complemented subspace isomorphic to c0(Y)c_0(Y), then, for some nNn \in \mathbb{N}, XnX^n has a subspace isomorphic to c0(Y)c_0(Y). We further prove the following: (1) If C(K)c0(C(K))C(K)\sim c_0(C(K)) and C(L)c0(C(L))C(L)\sim c_0(C(L)) and (C(K))(C(L))\ell_{\infty}(C(K))\sim \ell_{\infty}(C(L)), then KK and LL have the same cardinality. (2) If K1K_1 and K2K_2 are infinite metric compacta, then (C(K1))(C(K2))\ell_{\infty}(C(K_1))\sim \ell_{\infty}(C(K_2)) if and only if C(K1)C(K_1) is isomorphic to C(K2)C(K_2).

Keywords

Cite

@article{arxiv.2104.07152,
  title  = {Complementations in $C(K,X)$ and $\ell_\infty(X)$},
  author = {Leandro Candido},
  journal= {arXiv preprint arXiv:2104.07152},
  year   = {2021}
}
R2 v1 2026-06-24T01:10:54.609Z