Self-adjoint elliptic operators and manifold decompositions part I: Low Eigenmodes and stretching

Autor:	Ronnie Lee, Sylvain E. Cappell, Edward Y. Miller
Rok vydání:	1996
Předmět:	Applied Mathematics General Mathematics Mathematical analysis Limiting Manifold symbols.namesake Elliptic operator symbols Invariant (mathematics) Mathematics::Symplectic Geometry Lagrangian Self-adjoint operator Mathematics Decomposition theorem Symplectic geometry
Zdroj:	Communications on Pure and Applied Mathematics. 49:825-866
ISSN:	1097-0312 0010-3640
DOI:	10.1002/(sici)1097-0312(199608)49:8<825::aid-cpa3>3.0.co;2-a
Popis:	This paper is the first of a three-part investigation into the behavior of analytical invariants of manifolds that can be split into the union of two submanifolds. In this article, we will show how the low eigensolutions of a self-adjoint elliptic operator over such a manifold can be studied by a splicing construction. This construction yields an approximated solution of the operator whenever we have two L2-solutions on both sides and a common limiting value of two extended L2-solutions. In Part 11, the present analytic “Mayer-Vietoris” results on low eigensolutions and further analytic work will be used to obtain a decomposition theorem for spectral flows in terms of Maslov indices of Lagrangians. In Part I11 after comparing infinite- and finite-dimensional Lagrangians and determinant line bundles and then introducing “canonical perturbations” of Lagrangian subvarieties of symplectic varieties, we will study invariants of 3-manifolds, including Casson’s invariant. 0 1996 John Wiley & Sons, Inc.
Databáze:	OpenAIRE
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