Functional calculus and quantization commutes with reduction for Toeplitz operators on CR manifolds (Q6585675)

The study of Toeplitz operators plays an important role in pure mathematics and theoretical physics, which has profound impact on CR geometry and complex geometry.\N\NIn this paper, the authors show that the operators of the functional calculus for Toeplitz operators are complex Fourier integral operators of Szegő type, under some mild conditions on the eigenvalues of the Levi form on a CR manifold. \N\NBased on their previous work [J. Geom. Anal. 33, No. 1, Paper No. 21, 55 p. (2023; Zbl 1504.32096)] and applying spectral analysis an microlocal analysis, the authors deduce the main result.\N\NAs an application, they prove that quantization commutes with reduction for Toeplitz operators on CR manifolds admitting a compact Lie group action. Moreover, they consider CR manifolds with circle action and establish semi-classical asymptotics for the dimensions of the spectral spaces of Toeplitz operators. They also deduce semi-classical asymptotics for the dimensions of the spectral spaces of \(G\)-invariant Toeplitz operators.