Abstract
Let Ba,b be a weighted-fractional Brownian motion with indexes a and b satisfying |b|<1∧(1+a),a>−1 which is a central Gaussian process such that EBta,bBsa,b=1+b2∫0s∧tua((t−u)b+(s−u)b)du.In this paper, we consider the asymptotic normality associated with processes ∫0tBs+εa,b−Bsa,b2−taε1+bds,t∈[0,T],ε>0.As an application we study the asymptotic normality of the estimator of parameter σ>0 in stochastic process Xt=σBta,b−β∫0tXsds by using the generalized quadratic variation.
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