English

An approximation problem in the space of bounded operators

Functional Analysis 2022-03-22 v1

Abstract

For Banach spaces X,Y,X,Y, we consider a distance problem in the space of bounded linear operators L(X,Y).\mathcal{L}(X,Y). Motivated by a recent paper \cite{RAO21}, we obtain sufficient conditions so that for a compact operator TL(X,Y)T\in\mathcal{L}(X,Y) and a closed subspace ZY,Z\subset Y, the following equation holds, which relates global approximation with local approximation: d(T,L(X,Z))=sup{d(Tx,Z):xX,x=1}.d(T,\mathcal{L}(X,Z))=\sup\{d(Tx,Z):x\in X,\|x\|=1\}. In some cases, we show that the supremum is attained at an extreme point of the corresponding unit ball. Furthermore, we obtain some situations when the following equivalence holds: TBL(X,Z)Tx0BZTBL(X,Z),T\perp_B \mathcal{L}(X,Z)\Leftrightarrow T^{**}x_0^{**}\perp_B Z^{\perp\perp}\Leftrightarrow T^{**}\perp_B\mathcal{L}(X^{**},Z^{\perp\perp}), for some x0Xx_0^{**}\in X^{**} satisfying Tx0=Tx0,\|T^{**}x_0^{**}\|=\|T^{**}\|\|x_0^{**}\|, where ZZ^\perp is the annihilator of Z.Z. One such situation is when ZZ is an L1L^1-predual space and an MM-ideal in YY and TT is a multi-smooth operator of finite order. Another such situation is when XX is an abstract L1L_1-space and TT is a multi-smooth operator of finite order. Finally, as a consequence of the results, we obtain a sufficient condition for proximinality of a subspace ZZ in Y.Y.

Keywords

Cite

@article{arxiv.2203.10266,
  title  = {An approximation problem in the space of bounded operators},
  author = {Arpita Mal},
  journal= {arXiv preprint arXiv:2203.10266},
  year   = {2022}
}
R2 v1 2026-06-24T10:19:03.174Z