Weighted local Weyl laws for elliptic operators

Abstract

Let A be an elliptic pseudo-differential operator of order m on a closed manifold X of dimension n>0, formally positive self-adjoint with respect to some positive smooth density dμX. Then, the spectrum of A is made up of a sequence of eigenvalues (λk)k≥ 1 whose corresponding eigenfunctions (ek)k≥ 1 are C∞ smooth. Fix s∈R and define \[ KLs(x,y)=Σ0<λk≤ Lλk-s ek(x)ek(y)\, .\] We derive asymptotic formulae near the diagonal for the kernels KLs(x,y) when L→ +∞ with fixed s. For s=0, K0L is the kernel of the spectral projector studied by H\"ormander in ho68. In the present work we build on H\"ormander's result to study the kernels KsL. If s<nm, KLs is of order L-s+n/m and near the diagonal, the rescaled leading term behaves like the Fourier transform of an explicit function of the symbol of A. If s=nm, under some explicit generic condition on the principal symbol of A, which holds if A is a differential operator, the kernel has order (L) and the leading term has a logarithmic divergence smoothed at scale L-1/m. Our results also hold for elliptic differential Dirichlet eigenvalue problems.