A generalization of the boundedness of certain integral operators in variable Lebesgue spaces

Abstract

Let A1,...Am be a n× n invertible matrices. Let 0 ≤ α<n and 0<αi<n such that α1 + ... + αm = n- α. We define% equation* Tαf(x)=∫ 1 x-A1y α 1... x-Amy α mf(y)dy. equation*% In U-V we obtained the boundedness of this operator from Lp(.)(% Rn) into Lq(.)(Rn) for 1q(.)=1% p(.)-α n, in the case that Ai is a power of certain fixed matrix A~\ and for exponent functions p satisfying log-Holder conditions and p(Ay)=p(y), y∈ Rn . We will show now that the hypothesis on p, in certain cases, is necessary for the boundedness of Tα and we also prove the result for more general matrices Ai. Partially supported by CONICET and SECYTUNC Math. subject classification: 42B25, 42B35. Key words: Variable Exponents, Fractional Integrals.