Dirac operators and local invariants on perturbations of Minkowski space

Abstract

For small perturbations of Minkowski space, we show that the square of the Lorentzian Dirac operator P= -D2 has real spectrum apart from possible poles in a horizontal strip. Furthermore, for >0 we relate the poles of the spectral zeta function density of P-i to local invariants, in particular to the Lorentzian scalar curvature. The proof involves microlocal propagation and radial estimates in a resolved scattering calculus as well as high energy estimates in a further resolved classical-semiclassical calculus.

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