Comparison of two equivariant η-forms

Bo Liu; Xiaonan Ma

doi:10.1016/j.aim.2021.108163

Comparison of two equivariant η-forms

Bo Liu
, Xiaonan Ma^*

^*Corresponding author for this work

School of Mathematical Sciences

Université Paris Cité

Research output: Contribution to journal › Article › peer-review

Abstract

In this paper, we first define the equivariant infinitesimal η-form, then we compare it with the equivariant η-form, modulo exact forms, by a locally computable form. As a consequence, we obtain the singular behavior of the equivariant η-form, modulo exact forms, as a function on the acting Lie group. This result extends a result of Goette and it plays an important role in our recent work on the localization of η-invariants and on the differential K-theory.

Original language	English
Article number	108163
Journal	Advances in Mathematics
Volume	404
DOIs	https://doi.org/10.1016/j.aim.2021.108163
State	Published - 6 Aug 2022

Keywords

Equivariant infinitesimal η-form
Equivariant η-form
Index theorem
Kirillov formula

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10.1016/j.aim.2021.108163

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title = "Comparison of two equivariant η-forms",

abstract = "In this paper, we first define the equivariant infinitesimal η-form, then we compare it with the equivariant η-form, modulo exact forms, by a locally computable form. As a consequence, we obtain the singular behavior of the equivariant η-form, modulo exact forms, as a function on the acting Lie group. This result extends a result of Goette and it plays an important role in our recent work on the localization of η-invariants and on the differential K-theory.",

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AB - In this paper, we first define the equivariant infinitesimal η-form, then we compare it with the equivariant η-form, modulo exact forms, by a locally computable form. As a consequence, we obtain the singular behavior of the equivariant η-form, modulo exact forms, as a function on the acting Lie group. This result extends a result of Goette and it plays an important role in our recent work on the localization of η-invariants and on the differential K-theory.

KW - Equivariant infinitesimal η-form

KW - Equivariant η-form

KW - Index theorem

KW - Kirillov formula

UR - https://www.scopus.com/pages/publications/85122915553

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DO - 10.1016/j.aim.2021.108163

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SN - 0001-8708

VL - 404

JO - Advances in Mathematics

JF - Advances in Mathematics

M1 - 108163

ER -

Comparison of two equivariant η-forms

Abstract

Keywords

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