Type and cotype with respect to arbitrary orthonormal systems
摘要
Let be an orthonormal system on some -finite measure space . We study the notion of cotype with respect to for an operator between two Banach spaces and , defined by such that where is a sequence of independent and normalized gaussian variables. It is shown that this -cotype coincides with the usual notion of cotype iff \linebreak uniformly in iff there is a positive such that for all one can find an orthonormal and a sequence of disjoint measurable sets with A similar result holds for the type situation. The study of type and cotype with respect to orthonormal systems of a given length provides the appropriate approach to this result. We intend to give a quite complete picture for orthonormal systems in measure space with few atoms.
引用
@article{arxiv.math/9401205,
title = {Type and cotype with respect to arbitrary orthonormal systems},
author = {Stefan Geiss and Marius Junge},
journal= {arXiv preprint arXiv:math/9401205},
year = {2016}
}