Convergence in a Multidimensional Randomized Keynesian Beauty Contest

Grinfeld, Michael; Volkov, Stanislav; Wade, Andrew R.

doi:10.1239/aap/1427814581

Advances in Applied Probability

2015

DOI: 10.1239/aap/1427814581

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Convergence in a Multidimensional Randomized Keynesian Beauty Contest

Michael Grinfeld

Stanislav Volkov

Andrew R. Wade

Abstract: We study the asymptotics of a Markovian system of N ≥ 3 particles in [0, 1]d in which, at each step in discrete time, the particle farthest from the current centre of mass is removed and replaced by an independent U[0, 1]d random particle. We show that the limiting configuration contains N − 1 coincident particles at a random location ξN ∈ [0, 1]d. A key tool in the analysis is a Lyapunov function based on the squared radius of gyration (sum of squared distances) of the points. For d = 1, we give additional re… Show more

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Cited by 5 publications

References 14 publications

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Convergence in the p-Contest

Kennerberg

Volkov

2020

J Stat Phys

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We study asymptotic properties of the following Markov system of $$N \ge 3$$N≥3 points in [0, 1]. At each time step, the point farthest from the current centre of mass, multiplied by a constant $$p>0$$p>0, is removed and replaced by an independent $$\zeta $$ζ-distributed point; the problem, inspired by variants of the Bak–Sneppen model of evolution and called a p-contest, was posed in Grinfeld et al. (J Stat Phys 146, 378–407, 2012). We obtain various criteria for the convergences of the system, both for $$p<1$$p<1 and $$p>1$$p>1. In particular, when $$p<1$$p<1 and $$\zeta \sim U[0,1]$$ζ∼U[0,1], we show that the limiting configuration converges to zero. When $$p>1$$p>1, we show that the configuration must converge to either zero or one, and we present an example where both outcomes are possible. Finally, when $$p>1$$p>1, $$N=3$$N=3 and $$\zeta $$ζ satisfies certain mild conditions (e.g. $$\zeta \sim U[0,1]$$ζ∼U[0,1]), we prove that the configuration converges to one a.s. Our paper substantially extends the results of Grinfeld et al. (Adv Appl Probab 47:57–82, 2015) and Kennerberg and Volkov (Adv Appl Probab 50:414–439, 2018) where it was assumed that $$p=1$$p=1. Unlike the previous models, one can no longer use the Lyapunov function based just on the radius of gyration; when $$0<p<1$$0<p<1 one has to find a more finely tuned function which turns out to be a supermartingale; the proof of this fact constitutes an unwieldy, albeit necessary, part of the paper.

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Convergence in the p-Contest

Kennerberg

Volkov

2020

J Stat Phys

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A Local Barycentric Version of the Bak–Sneppen Model

Kennerberg

Volkov

2021

J Stat Phys

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We study the behaviour of an interacting particle system, related to the Bak–Sneppen model and Jante’s law process defined in Kennerberg and Volkov (Adv Appl Probab 50:414–439, 2018). Let $$N\ge 3$$ N ≥ 3 vertices be placed on a circle, such that each vertex has exactly two neighbours. To each vertex assign a real number, called fitness (we use this term, as it is quite standard for Bak–Sneppen models). Now find the vertex which fitness deviates most from the average of the fitnesses of its two immediate neighbours (in case of a tie, draw uniformly among such vertices), and replace it by a random value drawn independently according to some distribution $$\zeta $$ ζ . We show that in case where $$\zeta $$ ζ is a finitely supported or continuous uniform distribution, all the fitnesses except one converge to the same value.

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The limit point in the Jante’s law process has an absolutely continuous distribution

Crane,

Volkov

2024

Stochastic Processes and their Applications

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Convergence in a Multidimensional Randomized Keynesian Beauty Contest

Cited by 5 publications

References 14 publications

Convergence in the p-Contest

Convergence in the p-Contest

A Local Barycentric Version of the Bak–Sneppen Model

The limit point in the Jante’s law process has an absolutely continuous distribution

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