The logic of imaginary scenarios

Imagining is something we use everyday in our lives and in a wide variety of ways. In spite of the amount of works devoted to its study from both psychology and philosophy, there are only a few formal systems capable of modelling it; besides, almost all of those systems are static, in the sense that...

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Detalles Bibliográficos
Autores: Casas-Roma, Joan, Huertas, M. Antonia, Rodríguez-González, M. Elena
Tipo de recurso: artículo
Estado:Versión aceptada para publicación
Fecha de publicación:2019
País:España
Institución:Universitat Oberta de Catalunya (UOC)
Repositorio:O2, repositorio institucional de la UOC
OAI Identifier:oai:openaccess.uoc.edu:10609/110066
Acceso en línea:https://hdl.handle.net/10609/110066
Access Level:acceso embargado
Palabra clave:imagination logic
hybrid logic
dynamic logic
dynamic imagination
imaginary worlds
lògica de la imaginació
lògica híbrida
lògica dinàmica
imaginació dinàmica
mons imaginaris
lógica de la imaginación
lógica híbrida
lógica dinámica
imaginación dinámica
mundos imaginarios
Imagination
Imaginació
Imaginación
Descripción
Sumario:Imagining is something we use everyday in our lives and in a wide variety of ways. In spite of the amount of works devoted to its study from both psychology and philosophy, there are only a few formal systems capable of modelling it; besides, almost all of those systems are static, in the sense that their models are initially predefined, and they fail to capture the dynamic process behind the creation of new imaginary scenarios. In this work, we review some influential theories of imagination and use their insights to distil an algorithm describing such process. Then, we use this algorithm to define a dynamic logical system built upon on a single-agent epistemic logic that provides the necessary tools to capture how the agent voluntarily creates new imaginary worlds; in other words, our system allows the model to be expanded dynamically at any time as a result of the agent performing an act of imagination. Furthermore, we provide an axiomatization and prove that the system is sound and complete.