AbstractThe quadratic variation of functionals of the two-parameter Wiener process of the form f(W(s, t)) is investigated, where W(s, t) is the standard two-parameter Wiener process and f is a function on the reals. The existence of the quadratic variation is obtained under the condition that f′ is locally absolutely continuous and fN is locally square integrable
International audienceWe introduce the notion of covariance measure structure for square integrable ...
AbstractNonanticipative linear transformations of the two-parameter Wiener process W are studied. It...
AbstractWe introduce the notion of covariance measure structure for square integrable stochastic pro...
The quadratic variation of functionals of the two-parameter Wiener process of the form f (W(s, t)) i...
The quadratic variation of functionals of the two-parameter Wiener process of the form f(W(s, t)) is...
AbstractThe quadratic variation of functionals of the two-parameter Wiener process of the form f(W(s...
We are interested in the functional convergence in distribution of the process of quadratic variatio...
In this paper we give a central limit theorem for the weighted quadratic variation process of a two-...
In this paper we study the relation between different quadratic variations associated with a two-par...
AbstractIn this paper we study the relation between different quadratic variations associated with a...
We study average case approximation of Euler and Wiener integrated processes of d variables which a...
AbstractIn this paper, we establish functional convergence theorems for second order quadratic varia...
AbstractFor a one-parameter process of the form Xt=X0+∫t0φsdWs+∫t0ψsds, where W is a Wiener process ...
In this thesis we research and introduce several properties of paths of a Wiener process. At first w...
We study average case approximation of Euler and Wiener integrated processes of d variables which a...
International audienceWe introduce the notion of covariance measure structure for square integrable ...
AbstractNonanticipative linear transformations of the two-parameter Wiener process W are studied. It...
AbstractWe introduce the notion of covariance measure structure for square integrable stochastic pro...
The quadratic variation of functionals of the two-parameter Wiener process of the form f (W(s, t)) i...
The quadratic variation of functionals of the two-parameter Wiener process of the form f(W(s, t)) is...
AbstractThe quadratic variation of functionals of the two-parameter Wiener process of the form f(W(s...
We are interested in the functional convergence in distribution of the process of quadratic variatio...
In this paper we give a central limit theorem for the weighted quadratic variation process of a two-...
In this paper we study the relation between different quadratic variations associated with a two-par...
AbstractIn this paper we study the relation between different quadratic variations associated with a...
We study average case approximation of Euler and Wiener integrated processes of d variables which a...
AbstractIn this paper, we establish functional convergence theorems for second order quadratic varia...
AbstractFor a one-parameter process of the form Xt=X0+∫t0φsdWs+∫t0ψsds, where W is a Wiener process ...
In this thesis we research and introduce several properties of paths of a Wiener process. At first w...
We study average case approximation of Euler and Wiener integrated processes of d variables which a...
International audienceWe introduce the notion of covariance measure structure for square integrable ...
AbstractNonanticipative linear transformations of the two-parameter Wiener process W are studied. It...
AbstractWe introduce the notion of covariance measure structure for square integrable stochastic pro...