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We analyze a class of congestion games where two agents must send a finite amount of goods from an initial location to a terminal one. To do so the agents must use resources which are costly and costs are load dependent. In this context we assume that the agents have limited computational capability and they use a gradient rule as a decision mechanism. By introducing an appropriate dynamical system, which has the steady state exactly at the unique Nash equilibrium of the static congestion game, we investigate the dynamical behavior of the game. We provide a local stability condition in terms of the agents’ reactivity and the nonlinearity of the cost functions. In particular we show numerically that there is a route to complex dynamics: a cascade of flip-bifurcation leading to periodic cycles and finally to chaos.

Naimzada, A., Raimondo, R. (2018). Chaotic congestion games. APPLIED MATHEMATICS AND COMPUTATION, 321, 1339-1351 [10.1016/j.amc.2017.10.021].

Chaotic congestion games

Naimzada, AK;Raimondo, R

2018

Abstract

We analyze a class of congestion games where two agents must send a finite amount of goods from an initial location to a terminal one. To do so the agents must use resources which are costly and costs are load dependent. In this context we assume that the agents have limited computational capability and they use a gradient rule as a decision mechanism. By introducing an appropriate dynamical system, which has the steady state exactly at the unique Nash equilibrium of the static congestion game, we investigate the dynamical behavior of the game. We provide a local stability condition in terms of the agents’ reactivity and the nonlinearity of the cost functions. In particular we show numerically that there is a route to complex dynamics: a cascade of flip-bifurcation leading to periodic cycles and finally to chaos.

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	Sottotipologia
	
			Articolo in rivista - Articolo scientifico
		
	Parole chiave
	
			Bifurcation; Bounded rationality; Complex dynamics; Congestion games; Nash equilibrium;
		
	Parole chiave
	
			Congestion games, Nash equilibrium, Bounded rationality, Bifurcation, Complex dynamics
		
	Lingua del contenuto
	
			English
		
	Data ahead of print o Data prima pubblicazione Online
	
			2017
		
	Data di pubblicazione
	
			2018
		
	Rivista
	
			APPLIED MATHEMATICS AND COMPUTATION
		
	Numero del volume
	
			321
		
	Pagina iniziale
	
			1339
		
	Pagina finale
	
			1351
		
	DOI dell'articolo
	
			https://dx.doi.org/10.1016/j.amc.2017.10.021
		
	URL alternativo
	
			https://www.sciencedirect.com/journal/applied-mathematics-and-computation/vol/321/suppl/C
		
	Fulltext
	
			reserved
		
	Citazione
	
			Naimzada, A., Raimondo, R. (2018). Chaotic congestion games. APPLIED MATHEMATICS AND COMPUTATION, 321, 1339-1351 [10.1016/j.amc.2017.10.021].
		
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			01 - Articolo su rivista

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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10281/174518

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