Notes on Inequalities with Doubling Weights

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

We study two-weighted inequalities on John domains. We first introduce do-Ž . Ž mains that generalize the C C , M domains defined by HajLasz and Koskela J. . London Math. Soc., to appear and then show that our domains are actually just John domains. We then extend an interesting and nice result of

It is shown that if weighted polynomials w n P n with deg P n n converge uniformly on the support of the extremal measure associated with w, then they converge to 0 everywhere else. It is also shown that uniform approximation on the support can always be characterized by a closed subset Z having the

In this note, it is shown that the Hardy᎐Hilbert inequality for double series can Ž . be improved by introducing a proper weight function of the form rsin rp y Ž . 1y1rr Ž Ž . . O n rn with O n ) 0 into either of the two single summations. When r r r s 2, the classical Hilbert inequality is improved