- Date: 15 Feb. (Thu.)
- Place: W.W. 6th-floor, Colloquium Room
- Time: 16:30-18:00
- Speaker: Ngoc Khue Tran(Pham Van Dong University )
- Title: Local asymptotic properties for CIR process and a jump-type CIR process
- Abstract:
In the first part of this talk, we consider a Cox-Ingersoll-Ross (CIR) process whose drift coefficient depends on unknown parameters. Considering the process discretely observed at high frequency, we prove the local asymptotic normality (LAN) property in the subcritical case, the local asymptotic quadraticity (LAQ) in the critical case, and the local asymptotic mixed normality (LAMN) property in the supercritical case. To obtain these results, we use the Malliavin calculus techniques developed recently for CIR process by Alòs et al. and Altmayer et al. together with the $L^p$-norm estimation for positive and negative moments of the CIR process obtained by Bossy et al. and Ben Alaya et al.
In the second part, we will discuss the local asymptotic properties for a jump-type CIR process driven by a Brownian motion and a subordinator, whose growth rate is a unknown parameter. LAN is proved in the subcritical case, LAQ is derived in the critical case, and LAMN is shown in the supercritical case. This is a joint work with Mohamed Ben Alaya, Ahmed Kebaier and Gyula Pap.