Tyler Pierce , Rahul Rajkumar , Andrea Stine , David Weisbart , Adam M. Yassine
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引用次数: 0
摘要
对于任意自然数 d,弗拉基米洛夫-泰伯松算子是局部域 K 上 d 维向量空间 V 上复值函数拉普拉斯算子的自然类似物。正如 L2(Rd) 上的拉普拉斯算子是状态空间为 Rd 的布朗运动的无穷小发生器一样,L2(V) 上的 Vladimirov-Taibleson 算子是状态空间为 V 的实时布朗运动的无穷小发生器。本研究通过证明这两种扩散过程都是离散群上离散时间随机游走的缩放极限,深化了这两种扩散过程之间的形式类比。它概括了以前的研究,以前的研究把 V 限制为 p-adic 数。
Brownian motion in a vector space over a local field is a scaling limit
For any natural number , the Vladimirov–Taibleson operator is a natural analogue of the Laplace operator for complex-valued functions on a -dimensional vector space over a local field . Just as the Laplace operator on is the infinitesimal generator of Brownian motion with state space , the Vladimirov–Taibleson operator on is the infinitesimal generator of real-time Brownian motion with state space . This study deepens the formal analogy between the two types of diffusion processes by demonstrating that both are scaling limits of discrete-time random walks on a discrete group. It generalizes the earlier works, which restricted to be the -adic numbers.
期刊介绍:
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