On weighted Compactness of Commutators of square function and semi-group maximal function associated to Schrodinger operator
Abstract
In this paper, the object of our investigation is the following Littlewood-Paley square function g associated with the Schr\"odinger operator L=- +V which is defined by: g(f)(x)=(∫0∞|ddte-tL(f)(x)|2tdt)1/2, where is the laplacian operator on Rn and V is a nonnegative potential. We show that the commutators of g are compact operators from Lp(w) to Lp(w) for 1<p<∞ if b∈ CMOθ() and w∈ Ap,θ, where CMOθ() is the closure of Cc∞(Rn) in the BMOθ() topology which is more larger than the classical CMO space and Ap,θ is a weights class which is more larger than Muckenhoupt Ap weight class. An extra weight condition in a privious weighted compactness result is removed for the commutators of the semi-group maximal function defined by T*(f)(x)=t>0|e-tLf(x)|.
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