Weighted variational inequalities for heat semigroups associated with Schr\"odinger operators related to critical radius functions
Abstract
Let L be a Schr\"odinger operator and V(e-tL) be the variation operator of heat semigroup associated to L with >2. In this paper, we first obtain the quantitative weighted Lp bounds for V(e-tL) with a class of weights related to critical radius functions, which contains the classical Muckenhoupt weights as a proper subset. Next, a new bump condition, which is weaker than the classical bump condition, is given for two-weight inequality of V(e-tL), and the weighted mixed weak type inequality corresponding to Sawyer's conjecture for V(e-tL) are obtained. Furthermore, the quantitative restricted weak type (p,p) bounds for V(e-tL) are also given with a new class of weights Ap,θ,R, which is larger than the classical ApR weights. Meanwhile, several characterizations of Ap,q,α,θ,R in terms of restricted weak type estimates of maximal operators are established.
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