The L2-boundedness of the variational Calder\'on-Zygmund operators

Abstract

In this paper, we verify the L2-boundedness for the jump functions and variations of Calder\'on-Zygmund singular integral operators with the underlying kernels satisfying align*∫≤ |x-y|≤ N K(x,y)dy=∫≤ |x-y|≤ NK(x,y)dx=0\; ∀ 0<≤ N<∞,align* in addition to some proper size and smooth conditions. This result should be the first general criteria for the variational inequalities for kernels not necessarily of convolution type. The L2-boundedness assumption that we verified here is also the starting point of the related results on the (sharp) weighted norm inequalities appeared in many recent papers.