Open AccessGroup theoretical derivation of the minimal coupling principle
Author(s) -
Giuseppe Nisticò
Publication year - 2017
Publication title -
proceedings of the royal society a mathematical physical and engineering sciences
Language(s) - English
Resource type - Journals
eISSN - 1471-2946
pISSN - 1364-5021
DOI - 10.1098/rspa.2016.0629
Subject(s) - symmetry (geometry) , group (periodic table) , coupling (piping) , physics , group theory , order (exchange) , symmetry group , mathematical physics , free particle , minimal coupling , mathematics , classical mechanics , quantum , theoretical physics , quantum mechanics , pure mathematics , geometry , mechanical engineering , finance , engineering , economics
The group theoretical methods worked out by Bargmann, Mackey and Wigner, whichdeductively establish the Quantum Theory of a free particle for which Galileian transformations form a symmetry group, are extended to the case of an interacting particle. In doing so, the obstacles caused by loss of symmetry are overcome. In this approach, specific forms of the wave equation of an interacting particle, including the equation derived from the minimal coupling principle, are implied by particular first-order invariance properties that characterize the interaction with respect to specific subgroups of Galileian transformations; moreover, the possibility of yet unknown forms of the wave equation is left open.
Accelerating Research
Robert Robinson Avenue,
Oxford Science Park, Oxford
OX4 4GP, United Kingdom
Address
John Eccles HouseRobert Robinson Avenue,
Oxford Science Park, Oxford
OX4 4GP, United Kingdom