Functional calculus for Safarov pseudo-differential operators

Abstract

Given a smooth, closed Riemannian manifold (M,g) equipped with a linear connection ∇ (not necessarily metric), we develop the holomorphic functional calculus for operators belonging to the global pseudo-differential classes , δm(, ∇, τ) introduced by Safarov. As a consequence of our main result, we establish a Szeg\"o type-theorem, derive asymptotic expansion of the heat kernel trace, and calculate some associated spectral ζ-functions.

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