English

On a theorem due to Murray

Functional Analysis 2024-03-12 v1

Abstract

In this paper, we introduce the notions of α\alpha-quasicomplemented and totally α\alpha-quasicomplemented subspaces and we established some results under these contexts. We show, for example, that if XX is a separable or reflexive Banach space and YY is a closed infinite codimensional subspace of XX, then YY is totally α\mathit{\ }\alpha-quasicomplemented if, and only if, α<0\alpha<\aleph_{0} (this is an analogue of the theorem of Murray-Mackey and Lindenstrauss)\left( \text{this is an analogue of the theorem of Murray-Mackey and Lindenstrauss}\right) . We also show that if HH is a Hilbert space and Y,WHY,W\subset H are closed subspaces of HH such that WW is orthogonal to YY and codim(Y+W)=\operatorname{codim}\left( Y+W\right) =\infty, then YY has a quasicomplement ZZ containing WW with dimZ/W=\dim Z/W=\infty. Other results in the different contexts are also included. Such results establish a connection between the theory of quasicomplemented subspaces and (α,β)\left( \alpha,\beta\right) -spaceability.

Keywords

Cite

@article{arxiv.2403.05806,
  title  = {On a theorem due to Murray},
  author = {A. Barbosa and A. Raposo and G. Ribeiro},
  journal= {arXiv preprint arXiv:2403.05806},
  year   = {2024}
}
R2 v1 2026-06-28T15:14:21.361Z