Trace Expansions and the Noncommutative Residue for Manifolds with Boundary
Abstract
For a pseudodifferential boundary operator A of integer order and class zero (in the Boutet de Monvel calculus) on a compact n-dimensional manifold with boundary, we consider the function Trace(AB-s) where B is an auxiliary system formed of the Dirichlet realization of a second order strongly elliptic differential operator and an elliptic operator on the boundary. We prove that Trace(AB-s) has a meromorphic extension to the complex plane with poles at the half-integers s = (n+-j)/2, j = 0,1,... (possibly double for s<0), and we prove that its residue at zero equals the noncommutative residue of A, as defined by Fedosov, Golse, Leichtnam, and Schrohe by a different method. To achieve this, we establish a full asymptotic expansion of Trace(A(B-λ)-k) in powers of λ-j/2 and log-powers λ-j/2 log λ, where the noncommutative residue equals the coefficient of the highest log-power. There is a related expansion for Trace(A exp(-tB)).
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