Some s-numbers of an integral operator of Hardy type in Banach function spaces

Abstract

Let sn(T) denote the nth approximation, isomorphism, Gelfand, Kolmogorov or Bernstein number of the Hardy-type integral operator T given by Tf(x)=v(x)∫axu(t)f(t)dt,\,\,\,x∈(a,b)\,\,(-∞<a<b<+∞) and mapping a Banach function space E to itself. We investigate some geometrical properties of E for which C1∫abu(x)v(x)dx ≤n→∞nsn(T) ≤ n→∞nsn(T)≤ C2∫abu(x)v(x)dx under appropriate conditions on u and v. The constants C1,C2>0 depend only on the space E.