On the Modified Selberg Integral
Abstract
We give a kind of \lq \lq approximate majorant principle\rq \rq \thinspace result for the \lq \lq modified Selberg integral\rq \rq, say , of essentially bounded (i.e., bounded by arbitrary small powers); i.e., we get an upper bound, in terms of the modified Selberg integral of a related function (with , in the supports intersection), getting a \lq \lq square-root cancellation\rq \rq \thinspace for the error-terms. Here is the mean-square (in ) of the \lq \lq averaged short sum\rq \rq \thinspace of, say, , minus its expected value; i.e., , with expected value (say, ); so, this mean-square weights, on average, the values in (almost all, i.e. all, but possible exceptions) the short intervals , with mild restrictions on \thinspace \thinspace (say, \thinspace \thinspace and \thinspace , when \thinspace ).
Keywords
Cite
@article{arxiv.1006.1229,
title = {On the Modified Selberg Integral},
author = {Giovanni Coppola},
journal= {arXiv preprint arXiv:1006.1229},
year = {2010}
}
Comments
6 pages (Plain TeX)