Eigenvalues of non self-adjoint Toeplitz operators near an elliptic critical value with analytic regularity
Abstract
In this article, we determine the spectrum of real-analytic, non self-adjoint Toeplitz operators on compact K\"ahler manifolds and on the complex plane, on neighbourhoods of critical values of the symbol. We consider specifically critical values of the symbol on which its Hessian is elliptic and we get asymptotic expansion on eigenvalues in a neighbourhood with quantisation conditions similar to Bohr-Sommerfeld. To do so, we recall and further develop analytic semiclassical tools, in particular the symbolic calculus of complex Fourier integral operators using contour deformation. We detail the well known case of operators with quadratic symbols, and we treat a general case through normal form reduction. Finally, we prove resolvent estimates on norms with weights that come from the non-real part of the symbol.
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