Semiclassical asymptotic expansions for functions of the Bochner-Schr\"odinger operator
Abstract
The Bochner-Schr\"odinger operator Hp= 1pLp E+V on tensor powers Lp of a Hermitian line bundle L twisted by a Hermitian vector bundle E on a Riemannian manifold of bounded geometry is studied. For any function ∈ S( R), we consider the bounded linear operator (Hp) in L2(X,Lp E) defined by the spectral theorem and describe an asymptotic expansion of its smooth Schwartz kernel in a fixed neighborhood of the diagonal in the semiclassical limit p ∞. In particular, we prove that the trace of the operator (Hp) admits a complete asymptotic expansion in powers of p-1/2 as p ∞.
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