Weak equilibrium in a spatial model |
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| Authors: | Manuel Abellanas Ma Dolores López Javier Rodrigo Isabel Lillo |
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| Affiliation: | 1.Departamento de Matemática Aplicada de la Facultad de Informática,Universidad Politécnica de Madrid,Madrid,Spain;2.Departamento de Matemática Aplicada de la E.T.S.I. Caminos, Canales y Puertos,Universidad Politécnica de Madrid,Madrid,Spain;3.Departamento de Matemática Aplicada, E.T.S. de Ingeniería,Universidad Pontificia Comillas de Madrid,Madrid,Spain;4.IES Juan de la Cierva,Madrid,Spain |
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| Abstract: | Spatial models of two-player competition in spaces with more than one dimension almost never have pure-strategy Nash equilibria, and the study of the equilibrium positions, if they exist, yields a disappointing result: the two players must choose the same position to achieve equilibrium. In this work, a discrete game is proposed in which the existence of Nash equilibria is studied using a geometric argument. This includes a definition of equilibrium which is weaker than the classical one to avoid the uniqueness of the equilibrium position. As a result, a “region of equilibrium” appears, which can be located by geometric methods. In this area, the players can move around in an “almost-equilibrium” situation and do not necessarily have to adopt the same position. |
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