A bilinear sparse domination for the maximal singular integral operators with rough kernels
Abstract
Let be homogeneous of degree zero, integrable on Sd-1 and have mean value zero, T be the homogeneous singular integral operator with kernel (x)|x|d and T* be the maximal operator associated to T. In this paper, the authors prove that if ∈ L∞(Sd-1), then for all r∈ (1,\,∞), T* enjoys a (L,\,Lr) bilinear sparse domination with bound Cr'\|\|L∞(Sd-1), where (t)=t ( e2+t).
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