Spectral asymptotics of semi-classical Toeplitz operators on Levi non-degenerate CR manifolds

Abstract

We consider any compact CR manifold whose Levi form is non-degenerate of constant signature (n-,n+), n-+n+=n. For λ>0 and q∈\0,·s,n\, we let λ(q) be the spectral projection of the Kohn Laplacian of (0,q)-forms corresponding to the interval [0,λ]. For certain classical pseudodifferential operators P, we study a class of generalized elliptic Toeplitz operators TP,λ(q):=λ(q) P λ(q). For any cut-off ∈ C∞c( R\0\), we establish the full asymptotics of the semi-classical spectral projector (k-1TP,λ(q)) as k+∞. Our main result conclude that the smooth Schwartz kernel (k-1TP,λ(n-))(x,y) is the sum of two semi-classical oscillatory integrals with complex-valued phase functions.