We provide a proof for the invertibility of the \u85nite lag polynomial operator in the context of stochastic di¤erence equations, for the case where the polynomial roots lie inside/outside the complex unit circle. We establish invertibility and provide a characterisation for the inverse, using an elementary result from functional analysis.
[EN] In this paper we introduce the Laguerre polynomials as mean square solutions of random differen...
This article presents a new polynomial dimensional decomposition method for solving stochastic probl...
We examine the stability-instability behaviour of a polynomial difference equa- tion with state-inde...
Recent interest in polynomial moving average models has raised the question of their invertibility. ...
The polynomial inverse lag (PIL) of Mitchell and Speaker (1986) is a flexible distributed lag techni...
AbstractThe techniques of topological dynamics and differential-dynamical systems are used to study ...
This paper investigates the fundamental nature of the polynomial chaos (PC) response of dynamic syst...
We explain how an inner product derived from a perturbation of a weight function by the addition of ...
AbstractWe explain how an inner product derived from a perturbation of a weight function by the addi...
AbstractThe operator-theoretic (or inverse) method for stochastic differential equations is generali...
We propose an algebraic method for proving estimates on moments of stochastic integrals. The method ...
In this paper, the polynomial approximation of distributed lags is investigated within the framework...
AbstractIt is shown that the probability distribution of the value of a homogeneous polynomial in tw...
AbstractAdomian and his collaborators have found solutions for nonlinear stochastic (or deterministi...
Un morphisme d’espaces de probabilité vers l’espace de Wiener, qui est de plus adapté, peut être ass...
[EN] In this paper we introduce the Laguerre polynomials as mean square solutions of random differen...
This article presents a new polynomial dimensional decomposition method for solving stochastic probl...
We examine the stability-instability behaviour of a polynomial difference equa- tion with state-inde...
Recent interest in polynomial moving average models has raised the question of their invertibility. ...
The polynomial inverse lag (PIL) of Mitchell and Speaker (1986) is a flexible distributed lag techni...
AbstractThe techniques of topological dynamics and differential-dynamical systems are used to study ...
This paper investigates the fundamental nature of the polynomial chaos (PC) response of dynamic syst...
We explain how an inner product derived from a perturbation of a weight function by the addition of ...
AbstractWe explain how an inner product derived from a perturbation of a weight function by the addi...
AbstractThe operator-theoretic (or inverse) method for stochastic differential equations is generali...
We propose an algebraic method for proving estimates on moments of stochastic integrals. The method ...
In this paper, the polynomial approximation of distributed lags is investigated within the framework...
AbstractIt is shown that the probability distribution of the value of a homogeneous polynomial in tw...
AbstractAdomian and his collaborators have found solutions for nonlinear stochastic (or deterministi...
Un morphisme d’espaces de probabilité vers l’espace de Wiener, qui est de plus adapté, peut être ass...
[EN] In this paper we introduce the Laguerre polynomials as mean square solutions of random differen...
This article presents a new polynomial dimensional decomposition method for solving stochastic probl...
We examine the stability-instability behaviour of a polynomial difference equa- tion with state-inde...