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How can extremism prevail? An opinion dynamics model studied with heterogeneous agents and networks. Amblard F. , Deffuant G., Weisbuch G. C emagref-LISC ENS-LPS. Context. European project FAIR-IMAGES Modelling the socio-cognitive processes of adoption of AEMs by farmers
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How can extremism prevail?An opinion dynamics model studied with heterogeneous agents and networks Amblard F., Deffuant G., Weisbuch G. Cemagref-LISC ENS-LPS
Context • European project FAIR-IMAGES • Modelling the socio-cognitive processes of adoption of AEMs by farmers • 3 countries (Italy, UK, France) • Interdisciplinary project • Economics • Rural sociology • Agronomy • Physics • Computer and Cognitive Sciences
Modellers How to improve the model Experts Modelling Methodology Implementation Theoretical study Model proposal Comparison with data expertise
Many steps and then many models… • Cellular automata • Agent-based models • Threshold models • …
Final (???) model… • Huge model integrating: • Multi-criteria decision (homo socio-economicus) • Expert systems (economic evaluation) • Opinion dynamics model • Information diffusion • Institutional action (scenarios) • Social networks • Generation of virtual populations • …
Using/understanding of the final model • Using the model as a data transformation (inputs->model->outputs) we study correlations between inputs and outputs… • Model highly stochastic, then many replications • To understand the correlations? • We have to get back to basics… • Study each one of the component independently…
Bibliography • Opinion dynamics models • Models of binary opinions and vote models (Stokman and Van Oosten, Latané and Nowak, Galam, Galam and Wonczak, Kacpersky and Holyst) • Models with continuous opinions, negotiation framework, collective decision-making (Chatterjee and Seneta, Cohen et al., Friedkin and Johnsen) • Threshold Models (BC) (Krause, Deffuant et al., Dittmer, Hegselmann and Krause)
Opinion dynamics model • Basic features: • Agent-based simulation model • Including uncertainty about current opinion • Pair interactions • The less uncertain, the more convincing • Influence only if opinions are close enough • When influence, opinions move towards each other
First model (BC) • Bounded Confidence Model • Agent-based model • Each agent: • Opinion o [-1;1] (Initial Uniform Distribution) • Uncertainty u + • Pair interaction between agents (a, a’) • If |o-o’|<u o=µ.(o-o’) • µ = speed of opinion change = ct • Same dynamics for o’ • No dynamics on uncertainty (at this stage)
Homogeneous population (u=ct) • u=1.00 u=0.5
A brief analytical result… • Number of clusters = [w/2u] • w is width of the initial distribution • u the uncertainty
Introduction of uncertainty dynamics • With the same condition: • If |o-o’|<u o=µ.(o-o’) u=µ.(u-u’)
Main problem with BC modelis the influence profile oi oi-ui oi oi+ui oj
Relative Agreement Model (RA) • N agents i • Opinion oi (init. uniform distrib. [–1 ; +1]) • Uncertainty ui (init. ct. for the population) • Opinion segment [oi - ui ; oi + ui] • Pair interactions • Influence depends on the overlap between opinion segments • No influence if they are too far • The more certain the more convincing • Agents are influenced each other in opinion and uncertainty
j i oj oi hij hij-ui Relative Agreement Model Relative agreement
Relative Agreement Model Modifications of the opinion and the uncertainty are proportional to the “relative agreement” hijis the overlap between the two segments if Most certain agents are more influential
Continuous interaction functions o-u o o+u o-u o o+u o’-u’ o’ o’+u’ o’-u’ o’ o’+u’ h 1 -h h 1 -h
Continuous influence • No more sudden decrease in influence
Constant uncertainty in the population u=0.3(opinion segments)
u o +1 -1 Introduction of extremists • U : initial uncertainty of moderated agents • ue : initial uncertainty of extremists • pe : initial proportion of extremists • δ : balance between positive and negative extremists
Central convergence (pe = 0.2, U = 0.4, µ = 0.5, = 0, ue = 0.1, N = 200).
Both extremes convergence ( pe = 0.25, U = 1.2, µ = 0.5, = 0, ue = 0.1, N = 200)
Single extreme convergence(pe = 0.1, U = 1.4, µ = 0.5, = 0, ue = 0.1, N = 200)
Unstable Attractors: for the same parameters than before, central convergence
Systematic exploration • Introduction of the indicator y • p’+= prop. of moderated agents that converge to positive extreme • p’-= prop. Of moderated agents that converge to negative extreme • y = p’+2+ p’-2
Synthesis of the different cases with y • Central convergence • y = p’+2+ p’-2 = 0² + 0² = 0 • Both extreme convergence • y = p’+2+ p’-2 = 0.5² + 0.5² = 0.5 • Single extreme convergence • y = p’+2+ p’-2 = 1² + 0² = 1 • Intermediary values for y = intermediary situations • Variations of y in function of U and pe
δ = 0, ue = 0.1, µ = 0.2, N=1000 (repl.=50) • white, light yellow => central convergence • orange => both extreme convergence • brown => single extreme
What happens for intermediary zones? • Hypotheses: • Bimodal distribution of pure attractors (the bimodality is due to initialisation and to random pairing) • Unimodal distribution of more complex attractors with different number of agents in each cluster
pe = 0.125 δ = 0 (U > 1) => central conv. Or single extreme (0.5 < U < 1) => both extreme conv. (u < 0.5) => several convergences between central and both extreme conv.
Tuning the balance between the two extremesδ = 0.1, ue = 0.1, µ = 0.2
Conclusion • For a low uncertainty of the moderate (U), the influence of the extremists is limited to the nearest => central convergence • For higher uncertainties in the population, extremists tend to win (bipolarisation or conv. To a single extreme) • When extremists are numerous and equally distributed on the both sides, instability between central convergence and single extreme convergence (due to the position of the central group + and to the decrease of the uncertainties)
Modèle réalisé • Modèle stochastique • Trois types de liens : • Voisinage • Professionnels • Aléatoires • Attribut des liens : • Fréquence d’interactions • Paramètres du modèles : • densité et fréquence de chacun des types, • dl, • relation d’équivalence pour les liens professionnels
Network topologies • At the beginning: • Grid (Von Neumann and De Moore neighbourhoods) => better visualisation • What is planned • Small World networks (especially β-model enabling to go from regular networks to totally random ones) • Scale-free networks • Why focus on “abstract” networks? • Searching for typical behaviours of the model • No data available
Schematic behaviours • Convergence of the majority towards the centre • Isolation of the extremists (if totally isolated => central convergence) • If extremists are not totally isolated • If balance between non-isolated extremists of both side => double extr. conv. • Else => single extr. conv.
Problems • Criterions taken for the totally connected case does not enable to discriminate • With networks => more noisy situation to analyse… • Totally connected case => only pe, delta and U really matters • Network case • Population size • Ue matters (high Ue valorise central conv.)
