An upper bound on the Kolmogorov widths of a certain family of integral operators

Abstract

We consider the family of integral operators (Kαf)(x) from Lp[0,1] to Lq[0,1] given by (Kαf)(x)=∫01(1-xy)α -1\,f(y)\,d\!y, 0<α<1. The main objective is to find upper bounds for the Kolmogorov widths, where the nth Kolmogorov width is the infimum of the deviation of (Kαf) from an n-dimensional subspaces of Lp[0,1] (with the infimum taken over all n-dimensional subspaces), and is therefore a measure of how well Kα can be approximated. We find upper bounds for the Kolmogorov widths in question that decrease faster than (- n) for some positive constant .