Construction of maximum likelihood estimator in the mixed fractional--fractional Brownian motion model with double long-range dependence

Abstract

We construct an estimator of the unknown drift parameter θ∈ R in the linear model \[Xt=θ t+σ1BH1(t)+σ2BH2(t),\;t∈[0,T],\] where BH1 and BH2 are two independent fractional Brownian motions with Hurst indices H1 and H2 satisfying the condition 12≤ H1<H2<1. Actually, we reduce the problem to the solution of the integral Fredholm equation of the 2nd kind with a specific weakly singular kernel depending on two power exponents. It is proved that the kernel can be presented as the product of a bounded continuous multiplier and weak singular one, and this representation allows us to prove the compactness of the corresponding integral operator. This, in turn, allows us to establish an existence--uniqueness result for the sequence of the equations on the increasing intervals, to construct accordingly a sequence of statistical estimators, and to establish asymptotic consistency.