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Inverse Problems and Index Formulae for Dirac Operators

偏微分方程分析 2007-05-23 v2 微分几何

摘要

We consider a Dirac-type operator DPD_P on a vector bundle VV over a compact Riemannian manifold (M,g)(M,g) with a nonempty boundary. The operator DPD_P is specified by a boundary condition P(u\pM)=0P(u|_{\p M})=0 where PP is a projector which may be a non-local, i.e. a pseudodifferential operator. We assume the existence of a chirality operator which decomposes L2(M,V)L^2(M, V) into two orthogonal subspaces X+XX_+ \oplus X_-. Under certain conditions, the operator DPD_P restricted to X+X_+ and X X_- defines a pair of Fredholm operators which maps X+XX_+\to X_- and XX+X_-\to X_+ correspondingly, giving rise to a superstructure on VV. In this paper we consider the questions of determining the index of DPD_P and the reconstruction of (M,g),V(M, g), V and DPD_P from the boundary data on \pM\p M. The data used is either the Cauchy data, i.e. the restrictions to \pM×R+\p M \times \R_+ of the solutions to the hyperbolic Dirac equation, or the boundary spectral data, i.e. the set of the eigenvalues and the boundary values of the eigenfunctions of DPD_P. We obtain formulae for the index and prove uniqueness results for the inverse boundary value problems. We apply the obtained results to the classical Dirac-type operator in M×\C4M\times \C^4, MR3M \subset \R^3.

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引用

@article{arxiv.math/0501049,
  title  = {Inverse Problems and Index Formulae for Dirac Operators},
  author = {Yaroslav Kurylev and Matti Lassas},
  journal= {arXiv preprint arXiv:math/0501049},
  year   = {2007}
}