The Boundedness of the Bilinear Fractional Integrals along Curves

Abstract

In this paper, for general curves (t,γ(t)) satisfying some suitable curvature conditions, we obtain some Lp(R)× Lq(R) → Lr(R) estimates for the bilinear fractional integrals Hα,γ along the curves (t,γ(t)), where Hα,γ(f,g)(x):=∫0∞f(x-t)g(x-γ(t))\,dtt1-α and α∈ (0,1). At the same time, we also establish an almost sharp Hardy-Littlewood-Sobolev inequality, i.e., the Lp(R)→ Lq(R) estimate, for the fractional integral operators Iα,γ along the curves (t,γ(t)), where Iα,γf(x):=∫0∞|f(x-γ(t))|\,dtt1-α.

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