In this paper we consider Skorohod and Stratonovich-type integrals in a general setting of Gaussian processes. We show that a conversion formula holds when the covariance functions of the Gaussian process are of finite $\rho$-variation for $\rho\geq 1$ and that the diagonals of covariance functions are of finite $\rho'$-variation for $\rho'\geq 1$ such that $\frac{1}{\rho'}+\frac{1}{2\rho}>1$. The difference between the two types of integrals is identified with a Young integral. We also show that the Skorohod integral is the limit of a $[\rho]$-th order Skorohod-Riemann sum.
Non-central limit of densities of some functionals of Gaussian processes
Efficient simulation of Brown-Resnick processes based on variance reduction of Gaussian processes
On the Markov transformation of Gaussian processes
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