Edward Y. Miller scite author profile

In this paper we give four definitions of Maslov index and show that they all satisfy the same system of axioms and hence are equivalent to each other. Moreover, relationships of several symplectic and differential geometric, analytic, and topological invariants (including triple Maslov indices, eta invariants, spectral flow and signatures of quadratic forms) to the Maslov index are developed and formulae relating them are given. The broad presentation is designed with a view to applications both in geometry and in analysis. IntroductionThe object of this paper is to give a systematic and unified treatment of the Maslov index and some related invariants. In the literature, the Maslov index has often been described as an integer invariant associated to any one of the following situations: Here all three will be considered and compared with each other in Sections 1 to 9. Following [5] and [12], we regard the setting (i) as the main theme, whereas the others are variations.Let ( V , { , }) be a fixed symplectic vector space with symplectic pairing {,}, and let Lag(V) be the space of Lagrangian subspaces in V.

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The homology of the mapping class group

Miller¹

1986

J. Differential Geom.

119

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

Cappell

Lee

Miller

1996

Comm. Pure Appl. Math.

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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.

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Complex‐valued analytic torsion for flat bundles and for holomorphic bundles with (1,1) connections

Cappell

Miller

2009

Comm Pure Appl Math

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The work of Ray and Singer which introduced analytic torsion, a kind of determinant of the Laplacian operator in topological and holomorphic settings, is naturally generalized in both settings. The couplings are extended in a direct way in the topological setting to general flat bundles and in the holomorphic setting to bundles with (1,1) connections, which using the Newlander-Nirenberg Theorem are seen to be the bundles with both holomorphic and anti-holomorphic structures. The resulting natural generalizations of Laplacians are not always self-adjoint and the corresponding generalizations of analytic torsions are thus not always real-valued. The Cheeger-Muller theorem, on equivalence in a topological setting of analytic torsion to classical topological torsion, generalizes to this complex-valued torsion. On the algebraic side the methods introduced include a notion of torsion associated to a complex equipped with both boundary and coboundry maps.

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

Cappell¹,

Lee²,

Miller³

1996

Comm. Pure Appl. Math.

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Edward Y. Miller

On the maslov index

The homology of the mapping class group

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

Complex‐valued analytic torsion for flat bundles and for holomorphic bundles with (1,1) connections

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

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