Real Analytic Multi-parameter Singular Radon Transforms: necessity of the Stein-Street condition

Abstract

We study operators of the form Tf(x)= (x) ∫ f(γt(x))K(t)\,dt, where γt(x) is a real analytic function of (t,x) mapping from a neighborhood of (0,0) in RN × Rn into Rn satisfying γ0(x) x, (x) ∈ Cc∞(Rn), and K(t) is a "multi-parameter singular kernel" with compact support in RN; for example when K(t) is a product singular kernel. The celebrated work of Christ, Nagel, Stein, and Wainger studied such operators with smooth γt(x), in the single-parameter case when K(t) is a Calder\'on-Zygmund kernel. Street and Stein generalized their work to the multi-parameter case, and gave sufficient conditions for the Lp-boundedness of such operators. This paper shows that when γt(x) is real analytic, the sufficient conditions of Street and Stein are also necessary for the Lp-boundedness of T, for all such kernels K.