A new family of singular integral operators whose L2-boundedness implies rectifiability

Abstract

Let E ⊂ C be a Borel set such that 0<H1(E)<∞. David and L\'eger proved that the Cauchy kernel 1/z (and even its coordinate parts Re\, z/|z|2 and Im\, z/|z|2, z∈ C\0\) has the following property (*): the L2(H1 E)-boundedness of the corresponding singular integral operator implies the rectifiability of E. Recently Chousionis, Mateu, Prat and Tolsa extended this result to any kernel of the form (Re\, z)2n-1/|z|2n, n∈ N. In this paper, we prove that the property (*) is valid for operators associated to the much wider class of kernels (Re\, z)2N-1/|z|2N+t·(Re\, z)2n-1/|z|2n, where n,N are positive integer numbers such that N n, and t∈ R (t1,t2) with t1,t2 depending only on n and N.