Strongly essential flows on irreducible parabolic geometries

Karin Melnick; Katharina Neusser

doi:10.1090/tran/6814

Strongly essential flows on irreducible parabolic geometries

Karin Melnick, Katharina Neusser

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

4 Citations (Scopus)

Abstract

We study the local geometry of irreducible parabolic geometries admitting strongly essential flows; these are flows by local automorphisms with higher-order fixed points. We prove several new rigidity results and recover some old ones for projective and conformal structures, which show that in many cases the existence of a strongly essential flow implies local flatness of the geometry on an open set having the fixed point in its closure. For almost c-projective and almost quaternionic structures we can moreover show flatness of the geometry on a neighborhood of the fixed point.

Original language	English
Pages (from-to)	8079-8110
Number of pages	32
Journal	Transactions of the American Mathematical Society
Volume	368
Issue number	11
DOIs	https://doi.org/10.1090/tran/6814
Publication status	Published - 2016

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title = "Strongly essential flows on irreducible parabolic geometries",

abstract = "We study the local geometry of irreducible parabolic geometries admitting strongly essential flows; these are flows by local automorphisms with higher-order fixed points. We prove several new rigidity results and recover some old ones for projective and conformal structures, which show that in many cases the existence of a strongly essential flow implies local flatness of the geometry on an open set having the fixed point in its closure. For almost c-projective and almost quaternionic structures we can moreover show flatness of the geometry on a neighborhood of the fixed point.",

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N2 - We study the local geometry of irreducible parabolic geometries admitting strongly essential flows; these are flows by local automorphisms with higher-order fixed points. We prove several new rigidity results and recover some old ones for projective and conformal structures, which show that in many cases the existence of a strongly essential flow implies local flatness of the geometry on an open set having the fixed point in its closure. For almost c-projective and almost quaternionic structures we can moreover show flatness of the geometry on a neighborhood of the fixed point.

AB - We study the local geometry of irreducible parabolic geometries admitting strongly essential flows; these are flows by local automorphisms with higher-order fixed points. We prove several new rigidity results and recover some old ones for projective and conformal structures, which show that in many cases the existence of a strongly essential flow implies local flatness of the geometry on an open set having the fixed point in its closure. For almost c-projective and almost quaternionic structures we can moreover show flatness of the geometry on a neighborhood of the fixed point.

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U2 - 10.1090/tran/6814

DO - 10.1090/tran/6814

M3 - Article

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VL - 368

SP - 8079

EP - 8110

JO - Transactions of the American Mathematical Society

JF - Transactions of the American Mathematical Society

IS - 11

ER -

Strongly essential flows on irreducible parabolic geometries

Abstract

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