Nguyen Thanh Long

Copyright © 2006 Nguyen Thanh Long. 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

We consider the singular nonlinear integral equation u(x)=∫ℝNg(x,y,u(y))dy/|y−x|σ for all x∈RN where σ is a given positive constant and the given function g(x,y,u) is continuous and g(x,y,u)≥M|x|β1|y|β(1+|x|)−γ1(1+|y|)−γuα for all x,y∈RN,u≥0, with some constants α,β,β1,γ,γ1≥0 and M>0. We prove in an elementary way that if 0≤α≤(N+β−γ)/(σ+γ1−β1), (1/2)(N+β+β1−γ−γ1)<σ<min⁡{N,N+β+β1−γ−γ1}, σ+γ1−β1>0, N≥2 the above nonlinear integral equation has no positive solution.