English

On spreading sequences and asymptotic structures

Functional Analysis 2016-07-14 v1

Abstract

In the first part of the paper we study the structure of Banach spaces with a conditional spreading basis. The geometry of such spaces exhibit a striking resemblance to the geometry of James' space. Further, we show that the averaging projections onto subspaces spanned by constant coefficient blocks with no gaps between supports are bounded. As a consequence, every Banach space with a spreading basis contains a complemented subspace with an unconditional basis. This gives an affirmative answer to a question of H. Rosenthal. The second part contains two results on Banach spaces XX whose asymptotic structures are closely related to c0c_0 and do not contain a copy of 1\ell_1: i) Suppose XX has a normalized weakly null basis (xi)(x_i) and every spreading model (ei)(e_i) of a normalized weakly null block basis satisfies e1e2=1\|e_1-e_2\|=1. Then some subsequence of (xi)(x_i) is equivalent to the unit vector basis of c0c_0. This generalizes a similar theorem of Odell and Schlumprecht, and yields a new proof of the Elton-Odell theorem on the existence of infinite (1+ε)(1+\varepsilon)-separated sequences in the unit sphere of an arbitrary infinite dimensional Banach space. ii) Suppose that all asymptotic models of XX generated by weakly null arrays are equivalent to the unit vector basis of c0c_0. Then XX^* is separable and XX is asymptotic-c0c_0 with respect to a shrinking basis (yi)(y_i) of YXY\supseteq X.

Keywords

Cite

@article{arxiv.1607.03587,
  title  = {On spreading sequences and asymptotic structures},
  author = {D. Freeman and E. Odell and B. Sari and B. Zheng},
  journal= {arXiv preprint arXiv:1607.03587},
  year   = {2016}
}

Comments

25 pages

R2 v1 2026-06-22T14:53:04.670Z