Tail Bounds for Functions of Weighted Tensor Sums Derived from Random Walks on Riemannian Manifolds

Shih-Yu Chang
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Abstract

This paper presents significant advancements in tensor analysis and the study of random walks on manifolds. It introduces new tensor inequalities derived using the Mond-Pecaric method, which enriches the existing mathematical tools for tensor analysis. This method, developed by mathematicians Mond and Pecaric, is a powerful technique for establishing inequalities in linear operators and matrices, using functional analysis and operator theory principles. The paper also proposes novel lower and upper bounds for estimating column sums of transition matrices based on their spectral information, which is critical for understanding random walk behavior. Additionally, it derives bounds for the right tail of weighted tensor sums derived from random walks on manifolds, utilizing the spectrum of the Laplace-Beltrami operator over the underlying manifolds and new tensor inequalities to enhance the understanding of these complex mathematical structures.
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从黎曼曼曲面上的随机漫步推导出的加权张量和函数的尾界
本文介绍了张量分析和流形上随机漫步研究的重大进展。它介绍了利用蒙德-佩卡里克方法推导出的新的张量不等式,该方法丰富了现有的张量分析数学工具。该方法由数学家蒙德和佩卡里克开发,是一种利用函数分析和算子理论原理建立线性算子和矩阵不等式的强大技术。论文还根据过渡矩阵的谱信息,提出了估计过渡矩阵列和的新下限和上限,这对理解随机漫步行为至关重要。此外,论文还推导了流形上随机漫步推导出的加权张量和的右尾边界,利用底层流形上的拉普拉斯-贝尔特拉米算子谱和新的张量不等式,加深了对这些复杂数学结构的理解。
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