Type A and hardiness

In this paper, some new Hardy-type inequalities involving many functions are obtained. These on the one hand generalize and on the other hand improve some existing results by Isumi and Isumi, Levinson, and Pachpatte on this famous type of inequalities.

We show that certain Hardy-type inequalities hold in plump domains and domains with a Whitney cube #-condition. 1991 Mathematics Subject Classification. 46E35, 26D 10.

We provide a survey of the contributors of Des Evans dealing with operators T of the form T F (x) = v(x) x a u(t)f (t) dt acting between Lehesgue spaces, and also report on new results concerning the Bernstein widths and Kolmogorov numbers of T.

In this paper we consider operators of the form H = λ(-i∇) + V with λ analytic in a strip having some specific growth conditions at infinity and prove Hardy type estimates in L 2 (R n ) with exponential weights. In fact we extend our previous results [5] from bounded analytic functions on a strip to