Article
Version 1
Preserved in Portico This version is not peer-reviewed
Energy and Personality: A Bridge between Physics and Psychology
Version 1
: Received: 14 May 2021 / Approved: 17 May 2021 / Online: 17 May 2021 (07:56:34 CEST)
A peer-reviewed article of this Preprint also exists.
Caselles, A.; Micó, J.C.; Amigó, S. Energy and Personality: A Bridge between Physics and Psychology. Mathematics 2021, 9, 1339. Caselles, A.; Micó, J.C.; Amigó, S. Energy and Personality: A Bridge between Physics and Psychology. Mathematics 2021, 9, 1339.
Abstract
The objective of this paper is to present a mathematical formalism that states a bridge between Physics and Psychology, concretely between analytical dynamics and personality theory in order to open new insights in this theory. In this formalism energy plays a central role. First, the short-term personality dynamics can be measured by the General Factor of Personality (GFP) response to an arbitrary stimulus. This GFP dynamical response is modelled by a stimulus-response model: an integro-differential equation. The bridge between Physics and Psychology is provided when the stimulus-response model can be formulated as a linear second order differential equation and, subsequently, reformulated as a Newtonian equation. This bridge is strengthened when the Newtonian equation is derived from a minimum action principle, obtaining the current Lagrangian and Hamiltonian functions. However, the Hamiltonian is a non-conserved energy. Then, some changes provide a conserved Hamiltonian function: the Ermakov-Lewis energy. This energy is presented, as well as the GFP dynamical response that can be derived from it. An application case is presented: an experimental design in which 28 individuals consumed 26.51 g of alcohol. This experiment provides an ordinal scale for the Ermakov-Lewis energies that predicts the effect of a single dose of alcohol.
Keywords
personality dynamics; general factor of personality; stimulus-response model; minimum action principle; Hamiltonian; Ermakov-Lewis energy
Subject
Computer Science and Mathematics, Algebra and Number Theory
Copyright: This is an open access article distributed under the Creative Commons Attribution License which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.
Comments (0)
We encourage comments and feedback from a broad range of readers. See criteria for comments and our Diversity statement.
Leave a public commentSend a private comment to the author(s)
* All users must log in before leaving a comment