an:01906000
Zbl 1015.60047
Al??s, Elisa; Mazet, Olivier; Nualart, David
Stochastic calculus with respect to Gaussian processes
EN
Ann. Probab. 29, No. 2, 766-801 (2001).
00094824
2001
j
60H05 60H07 60G15
stochastic integrals; Malliavin calculus; It?? formula; fractional Brownian motion
The authors consider a family of Gaussian processes \((B_t)_{t\in {\mathbb R}_+}\) of the form \(B_t = \int_0^t K(t,s) dW_s\), where \(K\) is a deterministic kernel and \((W_t)_{t\in {\mathbb R}_+}\) is a standard Wiener process. They construct a stochastic calculus with respect to such processes via the stochastic calculus of variations, using the anticipating Skorokhod integral operator with respect to \((W_t)_{t\in {\mathbb R}_+}\), which is denoted by \(\delta\). The stochastic integral of an adapted process \(u\) with respect to \((B_t)_{t\in {\mathbb R}}\) is defined to be \(\delta (K^* u)\), where \(K^*\) is the adjoint of the operator with kernel \(K\). It?? and Stratonovich change of variable formulas and H??lder regularity results are proved for indefinite integrals with respect to \((B_t)_{t\in {\mathbb R}}\), for a wide class of deterministic (singular and regular) kernels \(K\). The results apply in particular to fractional Brownian motion with Hurst parameter \(H\in (1/4,1/2)\).
Nicolas Privault (La Rochelle)