An equivariant Atiyah–Patodi–Singer index theorem for proper actions II: the K-theoretic index

Hochs, Peter; Wang, Bai-Ling; Wang, Hang

doi:10.1007/s00209-021-02942-0

Cited by 4 publications

(1 citation statement)

References 43 publications

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“…This was later used in index theorems by Connes-Moscovici [17] and Wang [70]. More general versions of the g-trace were applied in recent results in index theory [36,69], including results on manifolds with boundary [34,35,57,71]. For semisimple Lie groups, a higher cyclic cocycle generalising the g-trace was constructed in [65] and applied in [33,57].…”

Section: Introductionmentioning

confidence: 99%

Equivariant analytic torsion for proper actions

Hochs¹,

Saratchandran²

2022

Preprint

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We construct an equivariant version of Ray-Singer analytic torsion for proper, isometric actions by locally compact groups on Riemannian manifolds, with compact quotients. We obtain results on convergence, metric independence, vanishing for even-dimensional manifolds, a product formula, and a decomposition of classical Ray-Singer analytic torsion as a sum over conjugacy classes of equivariant torsion on universal covers. We do explicit computations for the circle and the line acting on themselves, and for regular elliptic elements of SO0(3, 1) acting on 3-dimensional hyperbolic space. Our constructions and results generalise several earlier constructions of equivariant analytic torsion and their properties, most of which apply to finite or compact groups, or to fundamental groups of compact manifolds acting on their universal covers. These earlier versions of equivariant analytic torsion were associated to finite or compact conjugacy classes; we allow noncompact conjugacy classes, under suitable growth conditions.

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Section: Introductionmentioning

confidence: 99%

Equivariant analytic torsion for proper actions

Hochs¹,

Saratchandran²

2022

Preprint

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An Equivariant Atiyah–Patodi–Singer Index Theorem for Proper Actions I: The Index Formula

Hochs

Wang

2021

International Mathematics Research Notices

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Consider a proper, isometric action by a unimodular locally compact group $G$ on a Riemannian manifold $M$ with boundary, such that $M/G$ is compact. For an equivariant, elliptic operator $D$ on $M$, and an element $g \in G$, we define a numerical index ${\operatorname {index}}_g(D)$, in terms of a parametrix for $D$ and a trace associated to $g$. We prove an equivariant Atiyah–Patodi–Singer index theorem for this index. We first state general analytic conditions under which this theorem holds, and then show that these conditions are satisfied if $g=e$ is the identity element; if $G$ is a finitely generated, discrete group, and the conjugacy class of $g$ has polynomial growth; and if $G$ is a connected, linear, real semisimple Lie group, and $g$ is a semisimple element. In the classical case, where $M$ is compact and $G$ is trivial, our arguments reduce to a relatively short and simple proof of the original Atiyah–Patodi–Singer index theorem. In part II of this series, we prove that, under certain conditions, ${\operatorname {index}}_g(D)$ can be recovered from a $K$-theoretic index of $D$ via a trace defined by the orbital integral over the conjugacy class of $g$.

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Higher rho invariant and delocalized eta invariant at infinity

Chen¹,

Liu²,

Wang³

et al. 2020

Preprint

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In this paper, we introduce several new secondary invariants for Dirac operators on a complete Riemannian manifold with a uniform positive scalar curvature metric outside a compact set and use these secondary invariants to establish a higher index theorem for the Dirac operators. We apply our theory to study the secondary invariants for a manifold with corner with positive scalar curvature metric on each boundary face.

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An equivariant Atiyah–Patodi–Singer index theorem for proper actions II: the K-theoretic index

Cited by 4 publications

References 43 publications

Equivariant analytic torsion for proper actions

Equivariant analytic torsion for proper actions

An Equivariant Atiyah–Patodi–Singer Index Theorem for Proper Actions I: The Index Formula

Higher rho invariant and delocalized eta invariant at infinity

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