Caballero–Engel meet Lasry–Lions: A uniqueness result

IF 0.9 3区 经济学 Q3 BUSINESS, FINANCE
Fernando Alvarez, Francesco Lippi, Panagiotis Souganidis
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引用次数: 0

Abstract

In a Mean Field Game (MFG) each decision maker cares about the cross sectional distribution of the state and the dynamics of the distribution is generated by the agents’ optimal decisions. We prove the uniqueness of the equilibrium in a class of MFG where the decision maker controls the state at optimally chosen times. This setup accommodates several problems featuring non-convex adjustment costs, and complements the well known drift-control case studied by Lasry–Lions. Examples of such problems are described by Caballero and Engel in several papers, which introduce the concept of the generalized hazard function of adjustment. We extend the analysis to a general “impulse control problem” by introducing the concept of the “Impulse Hamiltonian”. Under the monotonicity assumption (a form of strategic substitutability), we establish the uniqueness of equilibrium. In this context, the Impulse Hamiltonian and its derivative play a similar role to the classical Hamiltonian that arises in the drift-control case.

Caballero-Engel 遇见 Lasry-Lions:唯一性结果
在均场博弈(MFG)中,每个决策者都关心状态的横截面分布,而分布的动态则由代理人的最优决策产生。我们证明了一类均场博弈中均衡的唯一性,在这类均场博弈中,决策者在最优选择的时间控制状态。这种设置适用于以非凸调整成本为特征的若干问题,是对 Lasry-Lions 所研究的众所周知的漂移控制案例的补充。卡瓦列罗和恩格尔在多篇论文中描述了此类问题的例子,并引入了广义调整危险函数的概念。我们通过引入 "脉冲哈密顿 "的概念,将分析扩展到一般的 "脉冲控制问题"。在单调性假设(战略可替代性的一种形式)下,我们确立了均衡的唯一性。在这种情况下,脉冲哈密顿及其导数的作用类似于漂移控制情况下的经典哈密顿。
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来源期刊
Mathematics and Financial Economics
Mathematics and Financial Economics MATHEMATICS, INTERDISCIPLINARY APPLICATIONS -
CiteScore
2.80
自引率
6.20%
发文量
17
期刊介绍: The primary objective of the journal is to provide a forum for work in finance which expresses economic ideas using formal mathematical reasoning. The work should have real economic content and the mathematical reasoning should be new and correct.
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