Weighted inequalities for Schrödinger type singular integrals on variable Lebesgue spaces (Q6589648)

The author studies singular integrals associated with the Schrödinger operator \({\mathcal L}=-\Delta +V\) in \(\mathbb R^d,\,d>2\). The nonnegative potential \(V\) is taken from the reverse Hölder class \(RH_q,\,q>d/2\) such that\N\[\N\left(\frac{1}{|B|}\int\limits_BV(y)^qdy\right)^{1/q}\leq\frac{C}{|B|}\int\limits_BV(y)dy\N\]\Nfor every ball \(B\subset\mathbb R^d\).\N\NFurther, the critical radius function \(\rho(x)\) is introduced, and it permits to define the variable \(L^{p(\dot)}(\mathbb R^d)\)-space and the weighted space \(L^{p(\dot)}(w)\). The author studies their properties and introduces weight classes \(A^{\rho}_p\) and \(A^{\rho}_{p(\dot)}\). The main goal of the author is to prove the boundedness in the \(L^{p(\dot)}(w)\)-space for the Schrödinger-Calderon-Zygmund operator\N\[\NTf(x)=\int\limits_{\mathbb R^d}K(x,y)f(y)dy\N\]\Nwith some assumptions for the kernel \(K:\mathbb R^d\times\mathbb R^d\rightarrow\mathbb R\) and restrictions on the operator \(T\). These results are presented in Theorems 20, 22, 24. The last chapter is devoted to applications of the obtained results to Riesz-Schrödinger singular integral operators of the following type \(\nabla{\mathcal L}^{-1/2}\) and \(\nabla^2{\mathcal L}^{-1}\) and their adjoints with potential \(V\in RH_q\).