arXiv:math/0311495 Abstract

arXiv:math/0311495 [math.DG]Abstract References Reviews Resources

Fredholm-Lagrangian-Grassmannian and the Maslov index

Published 2003-11-27Version 1

We explain the topology of the space, so called, Fredholm-Lagrangian-Grassmannain and the quantity ``Maslov index'' for paths in this space based on the standard theory of Functional Analysis. Our standing point is to define the Maslov index for arbitrary paths in terms of the fundamental spectral property of the Fredholm operators, which was first recognized by J. Phillips and used to define the ``Spectral flow''. We tried to make the arguments to be all elementary and we summarize basic facts for this article from Functional Analysis in the Appendix.

Comments: 64 pages, no figure

Categories: math.DG, math.SG

Subjects: 53D12, 58J30, 58B15, 53D50

Keywords: maslov index, fredholm-lagrangian-grassmannian, functional analysis, fundamental spectral property, standard theory

Related articles: Most relevant | Search more

arXiv:0811.2819 [math.DG] (Published 2008-11-17, updated 2011-06-22)

Symplectic Spinors, Holonomy and Maslov Index

Andreas Klein

arXiv:math/9905096 [math.DG] (Published 1999-05-17, updated 2000-04-24)

Stability of the Focal and Geometric Index in semi-Riemannian Geometry via the Maslov Index

Francesco Mercuri, Paolo Piccione, Daniel V. Tausk

arXiv:0808.1358 [math.DG] (Published 2008-08-11)

Comparison results for conjugate and focal points in semi-Riemannian geometry via Maslov index

Miguel Angel Javaloyes, Paolo Piccione

arXiv Analytics

arXiv:math/0311495 [math.DG]Abstract References Reviews Resources

Fredholm-Lagrangian-Grassmannian and the Maslov index

Links

Toolbox

arXiv:math/0311495 [math.DG]AbstractReferencesReviewsResources

Fredholm-Lagrangian-Grassmannian and the Maslov index

Links

Toolbox

arXiv:math/0311495 [math.DG]Abstract References Reviews Resources