In this paper we prove several weighted estimates for iterated product commutators generated by BMO -functions and the bilinear fractional integral operators on Morrey spaces. As a corollary we obtain new weighted estimates for Adams type inequality.
Let N > 1 be a real number and ε > 0 be given. In this paper, we will prove that, for a measurable subset S of [0,N] with positive density ε , there must be patterns of the formwhere γ is convex and has some curvature constraints, t > δ (ε,γ)γ −1 (N) and δ (ε,γ) is a positive constant depending only on ε and γ , γ −1 is the inverse function of γ . Our result extends Bourgain's result [2] to the general curve γ . We use Bourgain's energy pigeonholing argument and Li's σ -uniformity argument.
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