Weighted vector-valued estimates for a non-standard Calder\'on-Zygmund operator

Abstract

In this paper, the author considers the weighted vector-valued estimate for the operator defined by TAf(x)= p.\,v.∫Rn(x-y)|x-y|n+1(A(x)-A(y)-∇ A(y))f(y) dy, and the corresponding maximal operator TA*, where is homogeneous of degree zero, has vanishing moment of order one, A is a function in Rn such that ∇ A∈ BMO(Rn). By a pointwise estimate for \|\TAfk(x)\\|lq and the weighted Lp estimates for the sparse operator AS,\,L( L)βf(x)=ΣQ∈S\|f\|L( L)β,\,QQ(x) , the author establishes some weak and endpoint quantitative weighted vector-valued estimates for TA and TA*.