Reviews

Professor Themistocles M. Rassias
Department of Mathematics
National Technical University of Athens
Personal page: www.math.ntua.gr/~trassias/

One Hundred years ago, H. Wely published the well known Hilbert’s inequality. In 1925, G. H. Hardy gave an extension of it by introducing one pair of conjugate exponents (p, q), named as Hardy-Hilbert’s inequality. The Hilbert-type inequalities are a more wide class of analysis inequalities which are with the bilinear kernels, including Hardy-Hilbert’s inequality as the particular case. By making a great effort of mathematicians, the theory on Hilbert-type inequalities has now come into being in author’s a few publishing books. This book is a monograph about the theory of discrete Hilbert-type inequalities with the homogeneous kernels of real number-degree. Using the methods of Series Summation, Real Analysis, Functional Analysis and Operator Theory, and following the way of weight coefficients, the author introduces a few independent parameters to establish a number of discrete Hilbert-type inequalities with the homogeneous kernels of real number-degree and the best constant factors. The equivalent forms, the reverses as well as some multiple cases are also considered. As application, the author also considers a large number of particular examples. This book is suited to the people who are interested in the fields of Analysis Inequalities and Real Analysis. Reading this book may help readers to make good progress in research for Hilbert –type inequalities and their applications.

Jichang Kuang
Department of Mathematics, Hunan Normal University
Changsha, Hunan, China