On the logarithm component in trace defect formulas
摘要
In asymptotic expansions of resolvent traces for classical pseudodifferential operators on closed manifolds, the coefficient of is of special interest, since it is the first coefficient containing nonlocal elements from ; on the other hand if and it gives part of the index of . also equals the zeta function value at 0 when is invertible. is a trace modulo local terms, since and are local. By use of complex powers (or similar holomorphic families of order ), Okikiolu, Kontsevich and Vishik, Melrose and Nistor showed formulas for these trace defects in terms of residues of operators defined from , , and . The present paper has two purposes: One is to show how the trace defect formulas can be obtained from the resolvents in a simple way without use of the complex powers of as in the original proofs. We here also give a simple direct proof of a recent residue formula of Scott for . The other purpose is to establish trace defect residue formulas for operators on manifolds with boundary, where complex powers are not easily accessible; we do this using only resolvents. We also generalize Scott's formula to boundary problems.
关键词
引用
@article{arxiv.math/0411483,
title = {On the logarithm component in trace defect formulas},
author = {Gerd Grubb},
journal= {arXiv preprint arXiv:math/0411483},
year = {2007}
}
备注
41 pages