Add to ORKGWe study a stochastic model of consensus formation, introduced in 2015 by Grinfeld, Volkov and Wade, who called it a multidimensional randomized Keynesian beauty contest. The model was generalized by Kennerberg and Volkov, who called their generalization the Jante's law process. We consider a version of the model where the space of possible opinions is a convex body $\mathcal{B}$ in $\mathbb{R}^d$. $N$ individuals in a population each hold a (multidimensional) opinion in $\mathcal{B}$. Repeatedly, the individual whose opinion is furthest from the center of mass of the $N$ current opinions chooses a new opinion, sampled uniformly at random from $\mathcal{B}$. Kennerberg and Volkov showed that the set of opinions that are not furthest from th...
In this thesis we study the asymptotic behavior of the maximum interpoint distance of random points ...
In Achlioptas processes, starting from an empty graph, in each step two potential edges are chosen u...
The model determines a stochastic continuous process as continuous limit of a stochastic discrete pr...
We study a stochastic model of consensus formation, introduced in 2015 by Grinfeld, Volkov and Wade,...
Consider the process which starts with N ≥ 3 distinct points on ℝd, and fix a positive integer K < N...
We study the asymptotics of a Markovian system of N ≥ 3 particles in [0, 1]d in which, at each step ...
We study the asymptotics of a Markovian system of N ≥ 3 particles in [0, 1]d in which, at each step ...
The bounded confidence model of opinion dynamics, introduced by Deffuant et al, is a stochastic mode...
The bounded confidence model of opinion dynamics, introduced by Deffuant et al, is a stochastic mode...
This paper proves the existence of a stationary distribution for a class of Markov voting models. We...
abstract: We investigate the long time behavior of models of opinion formation. We consider the case...
Scaling limits are analyzed for stochastic continuous opinion dynamics systems, also known as gossi...
International audienceIn this note, we make explicit the law of the renormalized supercritical branc...
In the R-spread out, d-dimensional voter model, each site x of Zd has state (or ‘opinion’) 0 or 1 an...
International audienceThis paper deals with continuous-time opinion dynamics that feature the interp...
In this thesis we study the asymptotic behavior of the maximum interpoint distance of random points ...
In Achlioptas processes, starting from an empty graph, in each step two potential edges are chosen u...
The model determines a stochastic continuous process as continuous limit of a stochastic discrete pr...
We study a stochastic model of consensus formation, introduced in 2015 by Grinfeld, Volkov and Wade,...
Consider the process which starts with N ≥ 3 distinct points on ℝd, and fix a positive integer K < N...
We study the asymptotics of a Markovian system of N ≥ 3 particles in [0, 1]d in which, at each step ...
We study the asymptotics of a Markovian system of N ≥ 3 particles in [0, 1]d in which, at each step ...
The bounded confidence model of opinion dynamics, introduced by Deffuant et al, is a stochastic mode...
The bounded confidence model of opinion dynamics, introduced by Deffuant et al, is a stochastic mode...
This paper proves the existence of a stationary distribution for a class of Markov voting models. We...
abstract: We investigate the long time behavior of models of opinion formation. We consider the case...
Scaling limits are analyzed for stochastic continuous opinion dynamics systems, also known as gossi...
International audienceIn this note, we make explicit the law of the renormalized supercritical branc...
In the R-spread out, d-dimensional voter model, each site x of Zd has state (or ‘opinion’) 0 or 1 an...
International audienceThis paper deals with continuous-time opinion dynamics that feature the interp...
In this thesis we study the asymptotic behavior of the maximum interpoint distance of random points ...
In Achlioptas processes, starting from an empty graph, in each step two potential edges are chosen u...
The model determines a stochastic continuous process as continuous limit of a stochastic discrete pr...