An Operator Generalization of the Lo-Keng Hua Inequality

We show that transport inequalities, similar to the one derived by M. Talagrand (1996, Geom. Funct. Anal. 6, 587 600) for the Gaussian measure, are implied by logarithmic Sobolev inequalities. Conversely, Talagrand's inequality implies a logarithmic Sobolev inequality if the density of the measure i

In connection to the study of the isotonicity of the projection operator onto a closed convex set in an ordered Hilbert space, Isac has recently remarked the importance of an inequality named ``the property of four elements'' (PFE). In this paper a sharp inequality closely connected to (PFE) is prov

In this paper we give some conditions under which T q Ѩ f is maximal monotone Ž . in the Banach space X not necessarily reflexive , where T is a monotone operator from X into X \* and Ѩ f is the subdifferential of a proper lower semicontinuous Ä 4 convex function f, from X into ‫ޒ‬ j qϱ . We also gi

In this paper, we will give a lower bound on the gap by using a weak Poincare inequality which was introduced by M. Ro ckner and F.-Y. Wang (2000, Weak Poincare inequalities and L 2 -convergence rates of Markov semigroups, preprint). Also we will give estimates on the distribution function of ground