In this paper we introduce and discuss numerical schemes for the approximation of kinetic equations for flocking behavior with phase transitions that incorporate uncertain quantities. This class of schemes here considered make use of a Monte Carlo approach in the phase space coupled with a stochastic Galerkin expansion in the random space. The proposed methods naturally preserve the positivity of the statistical moments of the solution and are capable to achieve high accuracy in the random space. Several tests on a kinetic alignment model with self propulsion validate the proposed methods both in the homogeneous and inhomogeneous setting, shading light on the influence of uncertainties in phase transition phenomena driven by noise such as t...
In this paper we investigate Monte Carlo methods for the approximation of the posterior probability ...
In this paper, we extend a recently introduced multi-fidelity control variate for the uncertainty qu...
In this paper, we extend a recently introduced multi-fidelity control variate for the uncertainty qu...
In this paper we introduce and discuss numerical schemes for the approximationof kinetic equations f...
In this talk we will study the generalized polynomial chaos-stochastic Galerkin (gPC-SG) approach to...
In this work we focus on the construction of numerical schemes for the approximation of stochastic m...
In this paper, we develop a stochastic Asymptotic-Preserving (sAP) scheme for the kinetic chemotaxis...
In this paper, we focus on the construction of a hybrid scheme for the approximation of non-Maxwelli...
The study of uncertainty propagation is of fundamental importance in plasma physics simulations. To ...
In this paper the optimal control of flocking models with random inputs is investigated from a numer...
Kinetic equations play a major rule in modeling large systems of interacting particles. Recently the...
Abstract. We show that double mills are more stable than single mills under stochastic pertur-bation...
We show that double mills are more stable than single mills under stochastic perturbations in swarmi...
We present three algorithms for calculating rate constants and sampling transition paths for rare ev...
We show that double mills are more stable than single mills under stochastic perturbations in swarmi...
In this paper we investigate Monte Carlo methods for the approximation of the posterior probability ...
In this paper, we extend a recently introduced multi-fidelity control variate for the uncertainty qu...
In this paper, we extend a recently introduced multi-fidelity control variate for the uncertainty qu...
In this paper we introduce and discuss numerical schemes for the approximationof kinetic equations f...
In this talk we will study the generalized polynomial chaos-stochastic Galerkin (gPC-SG) approach to...
In this work we focus on the construction of numerical schemes for the approximation of stochastic m...
In this paper, we develop a stochastic Asymptotic-Preserving (sAP) scheme for the kinetic chemotaxis...
In this paper, we focus on the construction of a hybrid scheme for the approximation of non-Maxwelli...
The study of uncertainty propagation is of fundamental importance in plasma physics simulations. To ...
In this paper the optimal control of flocking models with random inputs is investigated from a numer...
Kinetic equations play a major rule in modeling large systems of interacting particles. Recently the...
Abstract. We show that double mills are more stable than single mills under stochastic pertur-bation...
We show that double mills are more stable than single mills under stochastic perturbations in swarmi...
We present three algorithms for calculating rate constants and sampling transition paths for rare ev...
We show that double mills are more stable than single mills under stochastic perturbations in swarmi...
In this paper we investigate Monte Carlo methods for the approximation of the posterior probability ...
In this paper, we extend a recently introduced multi-fidelity control variate for the uncertainty qu...
In this paper, we extend a recently introduced multi-fidelity control variate for the uncertainty qu...