Résumé
This paper proposes a generalization of Shleifer’s (RAND J Econ 16:319–327, 1985) model of yardstick competition to a dynamic framework. In a differential game setting, we show that the yardstick mechanism effectively replicates the first-best solution if players adopt open-loop behaviour rules and are symmetric at the initial time; in the absence of initial symmetry, the social efficiency is reached only in the asymptotic steady state. On the contrary, if players adopt Markovian behaviour rules, then the yardstick pricing rule cannot achieve the first-best solution along the equilibrium path of any Markov Perfect Nash Equilibrium.
Mots-clés
yardstick competition; dynamic price regulation; differential games;
Référence
Michele Bisceglia, Roberto Cellini et Luca Grilli, « On the dynamic optimality of yardstick regulation », Annals of Operations Research, vol. 315, avril 2022, p. 73–92.
Voir aussi
Publié dans
Annals of Operations Research, vol. 315, avril 2022, p. 73–92