中文

Weak Symplectic Functional Analysis and General Spectral Flow Formula

微分几何 2007-05-23 v1 辛几何

摘要

We consider a continuous curve of self-adjoint Fredholm extensions of a curve of closed symmetric operators with fixed minimal domain DmD_m and fixed {\it intermediate} domain DWD_W. Our main example is a family of symmetric generalized operators of Dirac type on a compact manifold with boundary with varying well-posed boundary conditions. Here DWD_W is the first Sobolev space and DmD_m the subspace of sections with support in the interior. We express the spectral flow of the operator curve by the Maslov index of a corresponding curve of Fredholm pairs of Lagrangian subspaces of the quotient Hilbert space DW/DmD_W/D_m which is equipped with continuously varying {\it weak symplectic structures} induced by the Green form. In this paper, we specify the continuity conditions; define the Maslov index in weak symplectic analysis; discuss the required weak inner Unique Continuation Property; derive a General Spectral Flow Formula; and check that the assumptions are natural and all are satisfied in geometric and pseudo-differential context. Applications are given to L2L^2 spectral flow formulae; to the splitting of the spectral flow on partitioned manifolds; and to linear Hamiltonian systems.

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引用

@article{arxiv.math/0406139,
  title  = {Weak Symplectic Functional Analysis and General Spectral Flow Formula},
  author = {Bernhelm Booss-Bavnbek and Chaofeng Zhu},
  journal= {arXiv preprint arXiv:math/0406139},
  year   = {2007}
}