A non-local problem for the Fokker-Planck equation related to the Becker-Döring model

Conlon, Joseph G.; Schlichting, André

doi:10.3934/dcds.2019079

Cited by 12 publications

(13 citation statements)

References 48 publications

(62 reference statements)

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“…Systems of interacting particles arise in a myriad of applications ranging from opinion dynamics [HK02], granular materials [BCCP98, CMV03,BGG13] and mathematical biology [KS71,BCM07] to statistical mechanics [MA01], galactic dynamics [BT08], droplet growth [CS17], plasma physics [Bit86], and synchronisation [Kur81]. Apart from being of independent interest, these systems find applications in a diverse range of fields such as: particle methods in numerical analysis [DMH10], consensus-based methods for global optimisation [CCTT18], and nonlinear filtering [CL97].…”

Section: Introductionmentioning

confidence: 99%

Long-Time Behaviour and Phase Transitions for the Mckean–Vlasov Equation on the Torus

Carrillo

Gvalani

Pavliotis

et al. 2019

Arch Rational Mech Anal

127

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We study the McKean-Vlasov equationwith periodic boundary conditions on the torus. We first study the global asymptotic stability of the homogeneous steady state. We then focus our attention on the stationary system, and prove the existence of nontrivial solutions branching from the homogeneous steady state, through possibly infinitely many bifurcations, under appropriate assumptions on the interaction potential. We also provide sufficient conditions for the existence of continuous and discontinuous phase transitions. Finally, we showcase these results by applying them to several examples of interaction potentials such as the noisy Kuramoto model for synchronisation, the Keller-Segel model for bacterial chemotaxis, and the noisy Hegselmann-Krausse model for opinion dynamics. 13 3.1. Trend to equilibrium in relative entropy 13 3.2. Linear stability analysis 14 4. Bifurcation theory 15 5. Phase transitions for the McKean-Vlasov equation 20 5.1. Discontinuous transition points 22 5.2. Continuous transition points 24 6. Applications 31 6.1. The generalised Kuramoto model 31 6.2. The noisy Hegselmann-Krause model for opinion dynamics 34 6.3. The Onsager model for liquid crystals 34 6.4. The Barré-Degond-Zatorska model for interacting dynamical networks 36 6.5. The Keller-Segel model for bacterial chemotaxis 36 Appendix A. Results from bifurcation theory 39 References 41

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Section: Introductionmentioning

confidence: 99%

Long-Time Behaviour and Phase Transitions for the Mckean–Vlasov Equation on the Torus

Carrillo

Gvalani

Pavliotis

et al. 2019

Arch Rational Mech Anal

127

View full text Add to dashboard Cite

show abstract

“…Also, once a qualitative convergence statement as (1) in Theorem 1.7 is proven, one could ask for an improvement to a quantitative statement, which seems possible by the tools developed in [CEL17,CS17] under suitable additional assumptions on the kernel.…”

Section: Introductionmentioning

confidence: 99%

The Exchange-Driven Growth Model: Basic Properties and Longtime Behavior

Schlichting

2019

J Nonlinear Sci

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The exchange-driven growth model describes a process in which pairs of clusters interact through the exchange of single monomers. The rate of exchange is given by an interaction kernel K which depends on the size of the two interacting clusters. Well-posedness of the model is established for kernels growing at most linearly and arbitrary initial data.The longtime behavior is established under a detailed balance condition on the kernel. The total mass density ̺, determined by the initial data, acts as an order parameter, in which the system shows a phase transition. There is a critical value ̺ c ∈ (0, ∞] characterized by the rate kernel. For ̺ ≤ ̺ c , there exists a unique equilibrium state ω ̺ and the solution converges strongly to ω ̺ . If ̺ > ̺ c the solution converges only weakly to ω ̺ c . In particular, the excess ̺ − ̺ c gets lost due to the formation of larger and larger clusters. In this regard, the model behaves similarly to the Becker-Döring equation.The main ingredient for the longtime behavior is the free energy acting as Lyapunov function for the evolution. It is also the driving functional for a gradient flow structure of the system under the detailed balance condition.

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“…Dawson suggests a strategy for characterizing long-time behavior using an invariant quantity for the moments of the distribution [46]. The result in this paper on Hölder exponents serves a similar purpose to the idea suggested by Dawson, but characterizing the equivalent approach with moments may provide an alternate strategy for proving convergence to steady state and bears resemblence to the strategy used to analyze the long-time behavior for Becker-D 'oring models of aggregation-fragmentation processes [47][48][49]. In related models possesing individual level selection and replicator-mutator or replicator-diffusion dynamics, formulation of these systems as gradient flows has provided a strategy for proving convergence of the dynamics to a steady-state solution [50,51], and others models with diffusion have used arguments regarding the principle eigenvalue of the diffusion operator [52,53] or decay of an energy-like function [54,55] to prove convergence to steady-state.…”

Section: Discussionmentioning

confidence: 84%

Analysis of Multilevel Replicator Dynamics for General Two-Strategy Social Dilemma

Cooney

2020

Bull Math Biol

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Here we consider a game-theoretic model of multilevel selection in which individuals compete based on their payoff and groups also compete based on the average payoff of group members. Our focus is on multilevel social dilemmas: games in which individuals are best off cheating, while groups of individuals do best when composed of many cooperators. We analyze the dynamics of the two-level replicator dynamics, a nonlocal hyperbolic PDE describing deterministic birthdeath dynamics for both individuals and groups. While past work on such multilevel dynamics has restricted attention to scenarios with exactly solvable within-group dynamics, we use comparison principles and an invariant property of the tail of the population distribution to extend our analysis to all possible two-player, two-strategy social dilemmas. In the Stag-Hunt and similar games with coordination thresholds, we show that any amount of between-group competition allows for fixation of cooperation in the population. For the Prisoners' Dilemma and Hawk-Dove game, we characterize the threshold level of between-group selection dividing a regime in which the population converges to a delta function at the equilibrium of the within-group dynamics from a regime in which betweengroup competition facilitates the existence of steady-state densities supporting greater levels of cooperation. In particular, we see that the threshold selection strength and average payoff at steady state depend on a tug-of-war between the individual-level incentive to be a defector in a many-cooperator group and the group-level incentive to have many cooperators over many defectors. We also find that lower-level selection casts a long shadow: if groups are best off with a mix of cooperators and defectors, then there will always be fewer cooperators than optimal at steady state, even in the limit of infinitely strong competition between groups.

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A non-local problem for the Fokker-Planck equation related to the Becker-Döring model

Cited by 12 publications

References 48 publications

Long-Time Behaviour and Phase Transitions for the Mckean–Vlasov Equation on the Torus

Long-Time Behaviour and Phase Transitions for the Mckean–Vlasov Equation on the Torus

The Exchange-Driven Growth Model: Basic Properties and Longtime Behavior

Analysis of Multilevel Replicator Dynamics for General Two-Strategy Social Dilemma

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