A Theory of Everything: When Information Geometry Meets the Generalized Brownian Motion and the Einsteinian Relativity

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引用次数: 1

Abstract

Information geometry (IG) is a fascinating combination of differential geometry and statistics where a Riemannian manifold's structure is applied to a statistical model. It may find numerous fascinating uses in the domains of theoretical neurology, machine learning, complexity, and (quantum) information theory, among others. (IG) aims to provide a differential-geometric perspective on statistical geodesic models' structure. In this case, IG, KD, and J-divergence (JD) are used to define the manifold of the Generalised Brownian Motion (GBM). Consequently, the geodesic equations (GEs) are devised, and GB information matrix exponential (IME) is presented. Moreover, for first time ever, the necessary and sufficient mathematical requirement that characterizes the developability of Generalized Brownian Motion (GBM) manifold is devised. Also, a novel sufficient and necessary conditions which characterizes the regions where the surface describing GBM is minimal is determined. Also, it is shown that GBM has a non-zero 0-Gaussian and Ricci curvatures. Consequently, this advances the establishment of a unified GBM- Relativistic Info-Geometric based analysis
万物理论:当信息几何学遇上广义布朗运动和爱因斯坦相对论
信息几何学(IG)是微分几何学与统计学的奇妙结合,它将黎曼流形的结构应用于统计模型。它可以在理论神经学、机器学习、复杂性和(量子)信息论等领域找到许多令人着迷的用途。(IG)旨在为统计大地模型的结构提供一个微分几何视角。在这种情况下,IG、KD 和 J-发散(JD)被用来定义广义布朗运动(GBM)的流形。因此,设计了大地方程(GEs),并提出了 GB 信息矩阵指数(IME)。此外,还有史以来第一次提出了表征广义布朗运动(GBM)流形可发展性的必要和充分数学条件。同时,还确定了一个新的充分必要条件,该条件描述了 GBM 表面最小的区域。此外,还证明了 GBM 具有非零的 0 高斯曲率和利玛窦曲率。因此,这推动了基于相对论信息几何的统一 GBM 分析的建立。
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