Logarithmic Cartan geometry on complex manifolds

Indranil Biswas; Sorin Dumitrescu; Benjamin McKay

doi:10.1016/j.geomphys.2019.103542

Logarithmic Cartan geometry on complex manifolds

Indranil Biswas
, Sorin Dumitrescu
, Benjamin McKay

School of Mathematical Sciences

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

Abstract

We pursue the study of holomorphic Cartan geometry with singularities. We introduce the notion of logarithmic Cartan geometry on a complex manifold, with polar part supported on a normal crossing divisor. In particular, we show that the push-forward of a Cartan geometry constructed using a finite Galois ramified covering is a logarithmic Cartan geometry (the polar part is supported on the ramification locus). We also study the specific case of the logarithmic Cartan geometry with the model being the complex affine space.

Original language	English
Article number	103542
Journal	Journal of Geometry and Physics
Volume	148
DOIs	https://doi.org/10.1016/j.geomphys.2019.103542
Publication status	Published - Feb 2020

Keywords

Holomorphic vector bundle
Logarithmic Cartan geometry
Logarithmic connection

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10.1016/j.geomphys.2019.103542

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abstract = "We pursue the study of holomorphic Cartan geometry with singularities. We introduce the notion of logarithmic Cartan geometry on a complex manifold, with polar part supported on a normal crossing divisor. In particular, we show that the push-forward of a Cartan geometry constructed using a finite Galois ramified covering is a logarithmic Cartan geometry (the polar part is supported on the ramification locus). We also study the specific case of the logarithmic Cartan geometry with the model being the complex affine space.",

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AB - We pursue the study of holomorphic Cartan geometry with singularities. We introduce the notion of logarithmic Cartan geometry on a complex manifold, with polar part supported on a normal crossing divisor. In particular, we show that the push-forward of a Cartan geometry constructed using a finite Galois ramified covering is a logarithmic Cartan geometry (the polar part is supported on the ramification locus). We also study the specific case of the logarithmic Cartan geometry with the model being the complex affine space.

KW - Holomorphic vector bundle

KW - Logarithmic Cartan geometry

KW - Logarithmic connection

UR - https://www.scopus.com/pages/publications/85075062770

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DO - 10.1016/j.geomphys.2019.103542

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SN - 0393-0440

VL - 148

JO - Journal of Geometry and Physics

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M1 - 103542

ER -

Logarithmic Cartan geometry on complex manifolds

Abstract

Keywords

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