Explicit Bounds on Certain Integral Inequalities

Using only the elementary properties of lattice-ordered groups, we give a simple w x proof of the inequality of Maligranda and Orlicz 2 in full generality.

The paper is devoted to integral inequalities for fractional derivatives within the weighted L 2 setting. We obtain a necessary and sufficient condition for the operator (&2) \* in R n , 0<\*<nÂ2, to possess the weighted positivity property where the weight is the fundamental solution of the operato

A method based on sequences is applied to derive inequalities between the arithmetic᎐geometric mean of Gauss, the logarithmic mean, and certain other means.

Duffin and Schaeffer type inequalities related to some ultraspherical polynomials are established. One of the results obtained reads as follows: Let f be a real algebraic polynomial of degree at most n, 1) for all k # [1, ..., n]. Moreover, equality holds if and only if f =\T n . 1998 Academic Pres