AbstractIt is shown that a Lévy white noise measure Λ always exists as a Borel measure on the dual K′ of the space K of C∞ functions on R with compact support. Then a characterization theorem that ensures that the measurable support of Λ is contained in S′ is proved. In the course of the proofs, a representation of the Lévy process as a function on K′ is obtained and stochastic Lévy integrals are studied
In order to prove the existence and the uniqueness of operator solutions of some white noise stocha...
In order to prove the existence and the uniqueness of operator solutions of some white noise stocha...
Translations and scalings defined on the Schwartz space of tempered distributions induce continuous ...
AbstractIt is shown that a Lévy white noise measure Λ always exists as a Borel measure on the dual K...
AbstractBy using a method of truncation, we derive the closed form of the Segal–Bargmann transform o...
Using the white noise space setting, we define and study stochastic integrals with respect to a clas...
It is shown how the relations of the renormalized squared white noise defined by Accardi, Lu, and ...
AbstractEmploying the Segal–Bargmann transform (S-transform for abbreviation) of regular Lévy white ...
A brief introduction to Gaussian White Noise Analysisinfo:eu-repo/semantics/publishedVersio
AbstractWe construct a white noise theory for Lévy processes. The starting point of this theory is a...
AbstractIt is shown that the second quantization Γ(K) for a continuous linear operator K on a certai...
AbstractIt is shown that the second quantization Γ(K) for a continuous linear operator K on a certai...
AbstractUsing the white noise space framework, we construct and study a class of Gaussian processes ...
In order to prove the existence and the uniqueness of operator solutions of some white noise stocha...
In order to prove the existence and the uniqueness of operator solutions of some white noise stocha...
In order to prove the existence and the uniqueness of operator solutions of some white noise stocha...
In order to prove the existence and the uniqueness of operator solutions of some white noise stocha...
Translations and scalings defined on the Schwartz space of tempered distributions induce continuous ...
AbstractIt is shown that a Lévy white noise measure Λ always exists as a Borel measure on the dual K...
AbstractBy using a method of truncation, we derive the closed form of the Segal–Bargmann transform o...
Using the white noise space setting, we define and study stochastic integrals with respect to a clas...
It is shown how the relations of the renormalized squared white noise defined by Accardi, Lu, and ...
AbstractEmploying the Segal–Bargmann transform (S-transform for abbreviation) of regular Lévy white ...
A brief introduction to Gaussian White Noise Analysisinfo:eu-repo/semantics/publishedVersio
AbstractWe construct a white noise theory for Lévy processes. The starting point of this theory is a...
AbstractIt is shown that the second quantization Γ(K) for a continuous linear operator K on a certai...
AbstractIt is shown that the second quantization Γ(K) for a continuous linear operator K on a certai...
AbstractUsing the white noise space framework, we construct and study a class of Gaussian processes ...
In order to prove the existence and the uniqueness of operator solutions of some white noise stocha...
In order to prove the existence and the uniqueness of operator solutions of some white noise stocha...
In order to prove the existence and the uniqueness of operator solutions of some white noise stocha...
In order to prove the existence and the uniqueness of operator solutions of some white noise stocha...
Translations and scalings defined on the Schwartz space of tempered distributions induce continuous ...