Sharp Pointwise Weyl Laws for Schr\"odinger Operators with Singular Potentials on Flat Tori

Abstract

The Weyl law of the Laplacian on the flat torus Tn is concerning the number of eigenvalues λ2, which is equivalent to counting the lattice points inside the ball of radius λ in Rn. The leading term in the Weyl law is cnλn, while the sharp error term O(λn-2) is only known in dimension n5. Determining the sharp error term in lower dimensions is a famous open problem (e.g. Gauss circle problem). In this paper, we show that under a type of singular perturbations one can obtain the pointwise Weyl law with a sharp error term in any dimensions. Moreover, this result verifies the sharpness of the general theorems for the Schr\"odinger operators HV=-g+V in the previous work of the authors, and extends the 3-dimensional results of Frank-Sabin to any dimensions.