On discrete fractional integral operators and related Diophantine equations
Abstract
We study discrete versions of fractional integral operators along curves and surfaces. lp lq estimates are obtained from upper bounds of the number of solutions of associated Diophantine systems. In particular, this relates the discrete fractional integral along the curve γ(m) = (m,m2,...,mk) to Vinogradov's mean value theorem. Sharp lp lq estimates of the discrete fractional integral along the hyperbolic paraboloid in Z3 are also obtained except for endpoints.
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