Ergodicity and Law-of-large numbers for the Volterra Cox-Ingersoll-Ross process

arXiv - QuantFin - Mathematical Finance Pub Date : 2024-09-06 DOI:arxiv-2409.04496
Mohamed Ben Alaya, Martin Friesen, Jonas Kremer
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Abstract

We study the Volterra Volterra Cox-Ingersoll-Ross process on $\mathbb{R}_+$ and its stationary version. Based on a fine asymptotic analysis of the corresponding Volterra Riccati equation combined with the affine transformation formula, we first show that the finite-dimensional distributions of this process are asymptotically independent. Afterwards, we prove a law-of-large numbers in $L^p$(\Omega)$ with $p \geq 2$ and show that the stationary process is ergodic. As an application, we prove the consistency of the method of moments and study the maximum-likelihood estimation for continuous and discrete high-frequency observations.
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Volterra Cox-Ingersoll-Ross 过程的遍历性和大数定律
我们研究了 $\mathbb{R}_+$ 上的 Volterra Volterra Cox-Ingersoll-Ross 过程及其静态版本。基于对相应的 Volterra Riccati 方程结合仿射变换公式的精细渐近分析,我们首先证明了该过程的有限维分布是渐近独立的。之后,我们证明了$L^p$(\Omega)$中的大数定律($p \geq 2$),并证明了静止过程是遍历的。作为应用,我们证明了常量法的一致性,并研究了连续和离散高频观测的最大似然估计。
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arXiv - QuantFin - Mathematical Finance
arXiv - QuantFin - Mathematical Finance
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