中文

1-complemented subspaces of spaces with 1-unconditional bases

泛函分析 2008-02-03 v1

摘要

We prove that if XX is a complex strictly monotone sequence space with 11-unconditional basis, YXY \subseteq X has no bands isometric to 22\ell_2^2 and YY is the range of norm-one projection from XX, then YY is a closed linear span a family of mutually disjoint vectors in XX. We completely characterize 11-complemented subspaces and norm-one projections in complex spaces p(q)\ell_p(\ell_q) for 1p,q<1 \leq p, q < \infty. Finally we give a full description of the subspaces that are spanned by a family of disjointly supported vectors and which are 11-complemented in (real or complex) Orlicz or Lorentz sequence spaces. In particular if an Orlicz or Lorentz space XX is not isomorphic to p\ell_p for some 1p<1 \leq p < \infty then the only subspaces of XX which are 11-complemented and disjointly supported are the closed linear spans of block bases with constant coefficients.

关键词

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}
}