Integral operators with rough kernels in variable Lebesgue spaces

Abstract

In this paper we study integral operators with kernels equation* K(x,y)= k1( x- A1y)...km( x-Amy), equation* ki(x)=i(x)|x|n/qi where i: Rn R are homogeneous functions of degree zero, satisfying a size and a Dini condition, Ai are certain invertible matrices, and nq1+… nqm=n-α, 0≤ α <n. We obtain the boundedness of this operator from Lp(·) into % Lq(·) for 1q(·)=1p(·)-α n, for certain exponent functions p satisfying weaker conditions than the classical log-H\"older conditions.