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1. Verfasser: Gao, Jinwei
Format: Preprint
Veröffentlicht: 2025
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Online-Zugang:https://arxiv.org/abs/2503.23756
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author Gao, Jinwei
author_facet Gao, Jinwei
contents We investigate the space of Hermitian metrics on a fixed complex vector bundle. This infinite-dimensional space has appeared in the study of Hermitian-Einstein structures, where a special L2-type Riemannian metric is introduced. We compute the metric spray, geodesics and curvature associated to this metric, and show that the exponential map is a diffeomorphsim. Though being geodesically complete, the space of Hermitian metrics is metrically incomplete, and its metric completion is proved to be the space of L2 integrable singular Hermitian metrics. In addition, both the original space and its completion are CAT(0). In the holomorphic case, it turns out that Griffiths seminegative/semipositive singular Hermitian metric is always "L2 integrable" in our sense. Also, in the Appendix, the Nash-Moser inverse function theorem is utilized to prove that, for any L2 metric on the space of smooth sections of a given fiber bundle, the exponential map is always a local diffeomorphism, provided that each fiber is nonpositively curved.
format Preprint
id arxiv_https___arxiv_org_abs_2503_23756
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On a natural L2 metric on the space of Hermitian metrics
Gao, Jinwei
Differential Geometry
We investigate the space of Hermitian metrics on a fixed complex vector bundle. This infinite-dimensional space has appeared in the study of Hermitian-Einstein structures, where a special L2-type Riemannian metric is introduced. We compute the metric spray, geodesics and curvature associated to this metric, and show that the exponential map is a diffeomorphsim. Though being geodesically complete, the space of Hermitian metrics is metrically incomplete, and its metric completion is proved to be the space of L2 integrable singular Hermitian metrics. In addition, both the original space and its completion are CAT(0). In the holomorphic case, it turns out that Griffiths seminegative/semipositive singular Hermitian metric is always "L2 integrable" in our sense. Also, in the Appendix, the Nash-Moser inverse function theorem is utilized to prove that, for any L2 metric on the space of smooth sections of a given fiber bundle, the exponential map is always a local diffeomorphism, provided that each fiber is nonpositively curved.
title On a natural L2 metric on the space of Hermitian metrics
topic Differential Geometry
url https://arxiv.org/abs/2503.23756