Matrix weighted inequalities for fractional type integrals associated to operators with new classes of weights
Abstract
Let e-tL be a analytic semigroup generated by -L, where L is a non-negative self-adjoint operator on L2(Rd). Assume that the kernels of e-tL, denoted by pt(x,y), only satisfy the upper bound: for all N>0, there are constants c,C>0 such that alignupper bound |pt(x,y)|≤Ctd/2e-|x-y|2ct(1+t(x)+ t(y))-N align holds for all x,y∈Rd and t>0. We first establish the quantitative matrix weighted inequalities for fractional type integrals associated to L with new classes of matrix weights, which are nontrivial extension of the results established by Li, Rahm and Wick [23]. Next, we give new two-weight bump conditions with Young functions satisfying wider conditions for fractional type integrals associated to L, which cover the result obtained by Cruz-Uribe, Isralowitz and Moen [6]. We point out that the new classes of matrix weights and bump conditions are larger and weaker than the classical ones given in [17] and [6], respectively. As applications, our results can be applied to settings of magnetic Schr\"odinger operator, Laguerre operators, etc.
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