A Retarded Gronwall-Like Inequality and Its Applications

In this paper, the weight coefficient of the form y n r 2 n q 1 with Ž . . n ) 0 is introduced. Improvements on Hilbert's inequality and the Hardy᎐ Littlewood inequality are established, and these results are extended. ᮊ 1997

## Abstract This paper deals with an improvement of a class of the Trudinger‐Moser inequality with a singular weight associated to the embedding of the standard Sobolev space __H__^1^~0~(Ω) into Orlicz spaces for any smooth domain \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyl

We derive a new general concentration-of-measure inequality. The concentration inequality applies, among others, to configuration functions as defined by Talagrand and also to combinatorial entropies such as the logarithm of the number of increasing subsequences in a random permutation and to Vapnik