domingo, 21 de marzo de 2021

Hyperopic Topologies

Conferencia 2 (2021)

Dr. Jaime Orrillo, Ph.D.
(Graduate Program in Economics, Catholic University of Brasilia, Brasilia, Brazil)

Título: Hyperopic Topologies.
Lugar: Plataforma ZOOM, ID: 6061005720.
Fecha: Martes 06 de abril de 2021.
Horario: 15h00 - 17h00.

Resumen: Myopic economic agents are well studied in economics. They are impatient. A myopic topology is a topology such that every continuous preference relation is myopic. If the space is l∞, the Mackey topology τM(l∞; l1), is the largest locally convex such topology. However, there is a growing interest in patient consumers. In this talk, we analyze the extreme case of consumers who only value the long run. We call such a consumer hyperopic. We define hyperopic preferences and hyperopic topologies. We show the existence of the largest locally convex hyperopic topology, we characterize its dual and we determine its relationship with the norm dual of l∞.

Jaime Orrillo is professor of economics and joined the Catholic University of Brasilia in 1999. He received a Ph.D. from Instituto de Matemática Pura e Aplicada (IMPA), Rio de Janeiro, Brazil. He has participated in the post-doctoral summer program - IMPA - Instituto de Matemática Pura e Aplicada since 2000. He has been a visiting professor at the University of Kent from 2014 to 2015. His research interests cover various aspects of Economic Theory and Mathematical Economics. He has published in several academic journals such as Journal Banking and Finance, Quantitative Finance, Economics Letters, Journal Mathematical of Economics, Mathematical Finance, International Journal of Economic Theory, among others. 

Fotos:

Jaime Orrillo y John Forbes Nash (Premio Nobel, año 1994; Premio Abel, año 2015)

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