Moments of continuous random variables admitting a probability density function are studied. We show that, under certain assumptions, the moments of a random variable can be characterised in terms of a Sylvester equation and of the steady-state output response of a specific interconnected system. This allows to interpret well-known notions and results of probability theory and statistics in the language of systems theory, including the sum of independent random variables, the notion of mixture distribution and results from renewal theory. The theory developed is based on tools from the center manifold theory, the theory of the steady-state response of nonlinear systems, and the theory of output regulation. Our formalism is illustrated by me...
AbstractWe provide an identity that relates the moment of a product of random variables to the momen...
In many cases, it is difcult to nd a solution to a system of difference equations with random struct...
We introduce some of the standard parameters associated to a random variable. The two most common ar...
Moments of continuous random variables admitting a probability density function are studied. We show...
Moments of continuous random variables with a probability density function which can be represented ...
In this paper, we describe a tool to aid in proving theorems about random variables, called the mome...
Inthis paper,we define partial moments for a univariate continuous random variable. A recurrence rel...
In the article, the linear dynamic random model of n–th order described by the random state equation...
[EN] In this paper a random differential equation system modeling population dynamics is investigate...
This paper proposes techniques for constructing non-parametric computational models describing the d...
Characteristic Functions (cf) have been used to establish the convergence of several independent and...
Abstract We consider the processes defined by a Langevin equation and the associated continuity eq...
A general method for obtaining moment inequalities for functions of independent random variables is ...
AbstractSome results based on the Korkine's identity and integral inequalities of Hölder and Grüss a...
We provide an identity that relates the moment of a product of random variables to the moments of di...
AbstractWe provide an identity that relates the moment of a product of random variables to the momen...
In many cases, it is difcult to nd a solution to a system of difference equations with random struct...
We introduce some of the standard parameters associated to a random variable. The two most common ar...
Moments of continuous random variables admitting a probability density function are studied. We show...
Moments of continuous random variables with a probability density function which can be represented ...
In this paper, we describe a tool to aid in proving theorems about random variables, called the mome...
Inthis paper,we define partial moments for a univariate continuous random variable. A recurrence rel...
In the article, the linear dynamic random model of n–th order described by the random state equation...
[EN] In this paper a random differential equation system modeling population dynamics is investigate...
This paper proposes techniques for constructing non-parametric computational models describing the d...
Characteristic Functions (cf) have been used to establish the convergence of several independent and...
Abstract We consider the processes defined by a Langevin equation and the associated continuity eq...
A general method for obtaining moment inequalities for functions of independent random variables is ...
AbstractSome results based on the Korkine's identity and integral inequalities of Hölder and Grüss a...
We provide an identity that relates the moment of a product of random variables to the moments of di...
AbstractWe provide an identity that relates the moment of a product of random variables to the momen...
In many cases, it is difcult to nd a solution to a system of difference equations with random struct...
We introduce some of the standard parameters associated to a random variable. The two most common ar...