A. Gogatishvill¹ and J. Lang²

Copyright © 1999 A. Gogatishvill and J. Lang. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

Let we have an integral operator Kf(x): =v(x)∫a(x)b(x)k(x,y)u(y)f(y)dy  for x>0 where a and b are nondecreasing functions, u and v are non-negative and finite functions, and k(x,y)≥0 is nondecreasing in x, nonincreasing in y and k(x,z)≤D[k(x,b(y))+k(y,z)] for y≤x and a(x)≤z≤b(y). We show that the integral operator K:X→Y where X and Y are Banach functions spaces with l-condition is bounded if and only if A<∞. Where A:=A0+A1 and A0:=supx≤y,a(y)≤b(x)‖χ(x,y)(.)v(.)k(.,b(x))‖Y ‖χ(a(y),b(x))u‖x′A1:=supx≤y,a(y)≤b(x) ‖χ(x,y)v‖Y ‖χ(a(y),b(x))(.)K(x,.)u(.)‖x′.