Estimates for strongly singular operators along curves

Abstract

For a proper function f on the plane, we study the operator \[ Tf(x,y) = 0 ∫1 f(x-t,y-tk) e2π i γ(t)(t) dt, \] where k1 and and γ are functions defined near the origin such that (t) 0 and |γ(t)|∞ as t 0. We give sufficient regularity and growth conditions on and γ for its multiplier to be a bounded function, and thus for the operator to be bounded on L2( R2). We consider an extension to Lp( R2), for certain p's.

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