Some Inequalities Involving the Constante, and an Application to Carleman's Inequality

Some inequalities involving e and their connections with some special functions and means are considered.

In this paper, the best approximating form of constant e and Hardy's inequality are discussed, and the improved conclusions of earlier work are achieved. w x Recently, Y. Bicheng 1, 2 attained the inequalities involving constant e, x 1 1 1 e 1 y -1 q e 1 y , 1 Ž . ž / ž / 2 x q 1 x 2 x q 1 Ž .

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

The constant y in the strengthened Cauchy-Buniakowski-Schwarz (C.B.S.) inequality plays a crucial role in the convergence rate of multilevel iterative methods as well as in the efficiency of a posteriori error estimators, that is in the framework of finite element approximations of S.P.D. problems.

When the health sector variable whose inequality is being investigated is binary, the minimum and maximum possible values of the concentration index are equal to micro-1 and 1-micro, respectively, where micro is the mean of the variable in question. Thus as the mean increases, the range of the possi