具有布朗空间运动的 $$\Lambda $$ -Fleming-Viot 过程的精确连续性模量

Pub Date : 2024-04-03 DOI:10.1007/s10959-024-01326-4

Huili Liu, Xiaowen Zhou

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引用次数: 0

摘要

对于一类在 $\mathbb {R}^d$ 中具有布朗空间运动的 $\Lambda $-Fleming-Viot 过程，其相关的 $\Lambda $-coalescents 从无穷大下降，我们为从相关的lookdown表示中恢复的祖先过程获得了尖锐的全局和局部连续性模量。作为应用，我们为 $\Lambda $-Fleming-Viot 支持过程建立了全局和局部连续性模量。特别是，如果（(2-\beta ,\beta)）凝聚态是（(1,2]\）的Beta（(2-\beta ,\beta)）凝聚态，而（(\beta =2\）对应于Kingman的凝聚态，那么对于（h(t)=\sqrt{t\log (1/t)}\)、全局连续性模量对于具有模量函数 $\sqrt{2\beta /(\beta -1)}h(t)$ 的支持过程来说是成立的，而对于具有模量函数 $\sqrt{2/(\beta -1)}h(t)$ 的支持过程来说，左右局部连续性模量都是成立的。

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Exact Modulus of Continuities for $$\Lambda $$ -Fleming–Viot Processes with Brownian Spatial Motion

For a class of $\Lambda $-Fleming–Viot processes with Brownian spatial motion in $\mathbb {R}^d$ whose associated $\Lambda $-coalescents come down from infinity, we obtain sharp global and local moduli of continuity for the ancestral processes recovered from the associated lookdown representations. As applications, we establish both global and local moduli of continuity for the $\Lambda $-Fleming–Viot support processes. In particular, if the $\Lambda $-coalescent is the Beta$(2-\beta ,\beta )$ coalescent for $\beta \in (1,2]$ with $\beta =2$ corresponding to Kingman’s coalescent, then for $h(t)=\sqrt{t\log (1/t)}$, the global modulus of continuity holds for the support process with modulus function $\sqrt{2\beta /(\beta -1)}h(t)$, and both the left and right local moduli of continuity hold for the support process with modulus function $\sqrt{2/(\beta -1)}h(t)$.

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