Asymptotic properties of AD(1, n) model and its maximum likelihood estimator
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This paper deals with the problem of global parameter estimation of affine diffusions in ℝ_+ ×ℝ^n denoted by AD(1, n) where n is a positive integer which is a subclass of affine diffusions introduced by Duffie et al in [14]. The AD(1, n) model can be applied to the pricing of bond and stock options, which is illustrated for the Vasicek, Cox-Ingersoll-Ross and Heston models. Our first result is about the classification of AD(1, n) processes according to the subcritical, critical and supercritical cases. Then, we give the stationarity and the ergodicity theorems of this model and we establish asymptotic properties for the maximum likelihood estimator in both subcritical and a special supercritical cases.
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