Local normal forms of em-wavefronts in affine flat coordinates

IF 0.4 4区 数学 Q4 MATHEMATICS
Naomichi Nakajima
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引用次数: 0

Abstract

. In our previous work, we have generalized the notion of dually flat or Hessian manifold to quasi-Hessian manifold ; it admits the Hessian metric to be degenerate but possesses a particular symmetric cubic tensor (generalized Amari-Centsov tensor). Indeed, it naturally appears as a singular model in information geometry and related fields. A quasi-Hessian manifold is locally accompanied with a possibly multi-valued potential and its dual, whose graphs are called the e -wavefront and the m -wavefront respectively, together with coherent tangent bundles endowed with flat connections. In the present paper, using those connections and the metric, we give coordinate-free criteria for detecting local diffeomorphic types of e/m -wavefronts, and then derive the local normal forms of those (dual) potential functions for the e/m -wavefronts in affine flat coordinates by means of Malgrange’s division theorem. This is motivated by an early work of Ekeland on non-convex optimization and Saji-Umehara-Yamada’s work on Riemannian geometry of wavefronts. Finally, we reveal a relation of our geometric criteria with information geometric quantities of statistical manifolds.
仿射平面坐标中em波前的局部正规形式
在我们之前的工作中,我们已经将对偶流形或Hessian流形的概念推广到拟Hessian歧管;它承认Hessian度量是退化的,但具有一个特殊的对称三次张量(广义Amari-Centsov张量)。事实上,它在信息几何和相关领域中自然地表现为一个奇异模型。拟Hessian流形局部伴随一个可能的多值势及其对偶,其图分别称为e波阵面和m波阵面,以及具有float连接的相干切丛。在本文中,利用这些连接和度量,我们给出了检测e/m-波前局部不同形态类型的无坐标准则,然后利用Malgrange除法定理导出了e/m-波阵面的(对偶)势函数的局部正规形式。这是由Ekeland关于非凸优化的早期工作和Saji Umehara Yamada关于波前的黎曼几何的工作所推动的。最后,我们揭示了我们的几何准则与统计流形的信息几何量之间的关系。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
CiteScore
0.90
自引率
0.00%
发文量
16
审稿时长
>12 weeks
期刊介绍: Kodai Mathematical Journal is edited by the Department of Mathematics, Tokyo Institute of Technology. The journal was issued from 1949 until 1977 as Kodai Mathematical Seminar Reports, and was renewed in 1978 under the present name. The journal is published three times yearly and includes original papers in mathematics.
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