Duality invariance implies Poincaré invariance

We consider all possible dynamical theories which evolve two transverse vector fields out of a three-dimensional Euclidean hyperplane, subject to only two assumptions: (i) the evolution is local in space, and (ii) the theory is invariant under "duality rotations" of the vector fields into...

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Bibliographic Details
Published inPhysical review letters Vol. 110; no. 1; p. 011603
Main Authors Bunster, Claudio, Henneaux, Marc
Format Journal Article
LanguageEnglish
Published United States 04.01.2013
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Summary:We consider all possible dynamical theories which evolve two transverse vector fields out of a three-dimensional Euclidean hyperplane, subject to only two assumptions: (i) the evolution is local in space, and (ii) the theory is invariant under "duality rotations" of the vector fields into one another. The commutators of the Hamiltonian and momentum densities are shown to be necessarily those of the Poincaré group or its zero signature contraction. Space-time structure thus emerges out of the principle of duality.
ISSN:1079-7114
DOI:10.1103/PhysRevLett.110.011603