Semi-classical spectral asymptotics of Toeplitz operators on strictly pseudodonvex domains

Abstract

On a relatively compact strictly pseudoconvex domain with smooth boundary in a complex manifold of dimension n we consider a Toeplitz operator TR with symbol a Reeb-like vector field R near the boundary. We show that the kernel of a weighted spectral projection (k-1TR), where is a cut-off function with compact support in the positive real line, is a semi-classical Fourier integral operator with complex phase, hence admits a full asymptotic expansion as k+∞. More precisely, the restriction to the diagonal (k-1TR)(x,x) decays at the rate O(k-∞) in the interior and has an asymptotic expansion on the boundary with leading term of order kn+1 expressed in terms of the Levi form and the pairing of the contact form with the vector field R.