Gradient flows in asymmetric metric spaces

Shin-ichi Ohta, Wei Zhao
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引用次数: 2

Abstract

This paper is devoted to the investigation of gradient flows in asymmetric metric spaces (for example, irreversible Finsler manifolds and Minkowski normed spaces) by means of discrete approximation. We study basic properties of curves and upper gradients in asymmetric metric spaces, and establish the existence of a curve of maximal slope, which is regarded as a gradient curve in the non-smooth setting. { Introducing} a natural convexity assumption on the potential function, { which is called the $(p,\lambda)$-convexity,} we also obtain some regularizing effects on the asymptotic behavior of curves of maximal slope. Applications include several existence results for gradient flows in Finsler manifolds, doubly nonlinear differential evolution equations on { infinite-dimensional Funk spaces}, and heat flow on compact Finsler manifolds.
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非对称度量空间中的梯度流
本文用离散逼近的方法研究了不对称度量空间(如不可逆的Finsler流形和Minkowski赋范空间)中的梯度流。研究了非对称度量空间中曲线和上梯度的基本性质,建立了非光滑条件下最大斜率曲线的存在性,并将其视为梯度曲线。{引入}势函数的自然凸性假设{称为$(p,\lambda)$-凸性},我们也得到了对最大斜率曲线渐近行为的一些正则化效果。应用包括Finsler流形中梯度流的存在性结果,无限维Funk空间上的双非线性微分演化方程,紧致Finsler流形上的热流。
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