Studies on concave Young-functions
Abstract
We succeeded to isolate a special class of concave Young-functions enjoying the so-called \emph{density-level property}. In this class there is a proper subset whose members have each the so-called degree of contraction denoted by , and map bijectively the interval onto itself. We constructed the fixed point of each of these functions. Later we proved that every positive number is the fixed point of a concave Young-function having as degree of contraction. We showed that every concave Young-function is square integrable with respect to a specific Lebesgue measure. We also proved that the concave Young-functions possessing the density-level property constitute a dense set in the space of concave Young-functions with respect to the distance induced by the -norm.
Cite
@article{arxiv.math/0605180,
title = {Studies on concave Young-functions},
author = {N. K. Agbeko},
journal= {arXiv preprint arXiv:math/0605180},
year = {2008}
}