Weighted L2 theory for the Euclidean Dirac operator in higher dimensions

Abstract

We study weighted L2 solvability for the Euclidean Dirac operator in dimensions n 3. We prove that, on the exterior domain RnB(0,1) with logarithmic weight =n|x|, no higher-dimensional analogue of the two-dimensional H\"ormander estimate can be controlled solely by ; we then establish weighted solvability for the weights |x|m with m≠ 0, for the quadratic weight x12, and for sufficiently small anisotropic perturbations of the Gaussian weight, with sharp constant 1/4 in the Gaussian case. The obstruction arises because, in dimensions n 3, the classical weighted identity is coercive only under a structural relation between and |∇|2, a condition that excludes the Gaussian weight and many polynomial weights. The method is based on a weighted identity for the conjugated unknown U:=ue-/2, together with suitable scalar and Clifford-valued multipliers; this identity yields the required coercive estimates and also gives weighted L2 solvability for the Poisson equation through the factorization =-D2.