English

Operators on the Stopping Time Space

Functional Analysis 2015-03-27 v1

Abstract

Let S1S^1 be the stopping time space and B1(S1)\mathcal{B}_1(S^1) be the Baire-1 elements of the second dual of S1S^1. To each element xx^{**} in the space B1(S1)\mathcal{B}_1(S^1) we associate a positive Borel measure μx\mu_{x^{**}} on the Cantor set. We use the measures {μx:xB1(S1)}\{\mu_{x^{**}}: x^{**}\in\mathcal{B}_1(S^1) \} to characterize the operators T:XS1T:X\to S^1, defined on a space XX with an unconditional basis, which preserve a copy of S1S^1. In particular, we show that TT preserves a copy of S1S^1 if and only if the set {μx:  xB1(S1)}\{\mu_{x^{**}}:\;x^{**}\in\mathcal{B}_1(S^1)\} is non separable as a subset of M(2N)\mathcal{M}(2^\mathbb{N}).

Keywords

Cite

@article{arxiv.1503.07756,
  title  = {Operators on the Stopping Time Space},
  author = {Dimitris Apatsidis},
  journal= {arXiv preprint arXiv:1503.07756},
  year   = {2015}
}

Comments

19 pages

R2 v1 2026-06-22T09:02:56.715Z