1-complemented subspaces of spaces with 1-unconditional bases
摘要
We prove that if is a complex strictly monotone sequence space with -unconditional basis, has no bands isometric to and is the range of norm-one projection from , then is a closed linear span a family of mutually disjoint vectors in . We completely characterize -complemented subspaces and norm-one projections in complex spaces for . Finally we give a full description of the subspaces that are spanned by a family of disjointly supported vectors and which are -complemented in (real or complex) Orlicz or Lorentz sequence spaces. In particular if an Orlicz or Lorentz space is not isomorphic to for some then the only subspaces of which are -complemented and disjointly supported are the closed linear spans of block bases with constant coefficients.
引用
@article{arxiv.math/9605214,
title = {1-complemented subspaces of spaces with 1-unconditional bases},
author = {Beata Randrianantoanina},
journal= {arXiv preprint arXiv:math/9605214},
year = {2008}
}