In this paper, we present the groundwork for an Itô/Malliavin stochastic cal-culus and Hida's white noise analysis in the context of a supersymmetry withZ3-graded algebras. To this end, we establish a ternary Fock space and the cor-responding strong algebra of stochastic distributions and present its applicationin the study of stochastic processes in this context.publishe
The introduction of a new (multiplicative) renormalization procedure leads to a Lie algebra for the...
In this paper, we start the study of stochastic processes over the skew field of quaternions. We dis...
In this paper, we start the study of stochastic processes over the skew field of quaternions. We dis...
In this paper we develop a framework to extend the theory of generalized stochastic processes in the...
We associate with the Grassmann algebra a topological algebra of distributions, which allows the stu...
The paper describes the structure of a new space of generalized Wiener functionals, (D∞)*, called th...
We discuss a new model for the analysis and simulation of stochastic systems which we call stochasti...
We develop a white noise framework and the theory of stochastic distribution spaces for Hilbert spac...
Given a Gaussian stationary increment processes, we show that a Skorokhod-Hitsuda stochastic integra...
Given a Gaussian stationary increment processes, we show that a Skorokhod-Hitsuda stochastic integra...
Stochastic analysis is the analysis of functionals defined on the Wiener space, i.e., the space on w...
Within the infinitary variety of σ-complete Riesz MV-algebras RMVσ, we introduce the algebraic analo...
THESIS 7418This thesis is concerned with the harmonic analysis of multidimensional generalised stoch...
AbstractWe develop a theory of non-commutative stochastic integration with respect to the creation a...
We discuss a new model for the analysis and simulation of stochastic systems which we call stochasti...
The introduction of a new (multiplicative) renormalization procedure leads to a Lie algebra for the...
In this paper, we start the study of stochastic processes over the skew field of quaternions. We dis...
In this paper, we start the study of stochastic processes over the skew field of quaternions. We dis...
In this paper we develop a framework to extend the theory of generalized stochastic processes in the...
We associate with the Grassmann algebra a topological algebra of distributions, which allows the stu...
The paper describes the structure of a new space of generalized Wiener functionals, (D∞)*, called th...
We discuss a new model for the analysis and simulation of stochastic systems which we call stochasti...
We develop a white noise framework and the theory of stochastic distribution spaces for Hilbert spac...
Given a Gaussian stationary increment processes, we show that a Skorokhod-Hitsuda stochastic integra...
Given a Gaussian stationary increment processes, we show that a Skorokhod-Hitsuda stochastic integra...
Stochastic analysis is the analysis of functionals defined on the Wiener space, i.e., the space on w...
Within the infinitary variety of σ-complete Riesz MV-algebras RMVσ, we introduce the algebraic analo...
THESIS 7418This thesis is concerned with the harmonic analysis of multidimensional generalised stoch...
AbstractWe develop a theory of non-commutative stochastic integration with respect to the creation a...
We discuss a new model for the analysis and simulation of stochastic systems which we call stochasti...
The introduction of a new (multiplicative) renormalization procedure leads to a Lie algebra for the...
In this paper, we start the study of stochastic processes over the skew field of quaternions. We dis...
In this paper, we start the study of stochastic processes over the skew field of quaternions. We dis...