Inverse-closedness of the set of integral operators with L1-continuously varying kernels

Abstract

Let N be an integral operator of the form (Nu)(x)=∫ Rcn(x,x-y)\,u(y)\,dy acting in Lp( Rc) with a measurable kernel n satisfying the estimate |n(x,y)|β(y), where β∈ L1. It is proved that if the function t n(t,·) is continuous in the norm of L1 and the operator 1+N has an inverse, then (1+N)-1=1+M, where M is an integral operator possessing the same properties.