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Main Authors: Bagchi, Arjun, M, Nachiketh, Soni, Pushkar
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2406.15061
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author Bagchi, Arjun
M, Nachiketh
Soni, Pushkar
author_facet Bagchi, Arjun
M, Nachiketh
Soni, Pushkar
contents We introduce null contractions of the Poincare and relativistic conformal algebras. The longitudinal null contraction involves writing the algebra in lightcone coordinates and contracting one of the null directions. For the Poincare algebra, this yields two non-overlapping co-dimension one Carroll algebras. The transverse contraction is a limit on the spatial dimensions and yields two non-overlapping co-dimension one Galilean algebras. We find, similar to Susskind's original observation of the non-relativistic case, that the Poincare algebra, written in the lightcone coordinates, naturally contains Carrollian sub-algebras in one lower dimension. The effect of the longitudinal contraction, which essentially focusses on the null direction, is to disentangle the two Carroll algebras that now correspond to the symmetries of the two null boundaries. The transverse contraction similarly separates the overlapping Galilean sub-algebras of the original Poincare algebra. We discuss aspects of the conformal case, where we get lower dimensional Carroll Conformal algebras and Schrodinger algebras.
format Preprint
id arxiv_https___arxiv_org_abs_2406_15061
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Anatomy of Null Contractions
Bagchi, Arjun
M, Nachiketh
Soni, Pushkar
High Energy Physics - Theory
We introduce null contractions of the Poincare and relativistic conformal algebras. The longitudinal null contraction involves writing the algebra in lightcone coordinates and contracting one of the null directions. For the Poincare algebra, this yields two non-overlapping co-dimension one Carroll algebras. The transverse contraction is a limit on the spatial dimensions and yields two non-overlapping co-dimension one Galilean algebras. We find, similar to Susskind's original observation of the non-relativistic case, that the Poincare algebra, written in the lightcone coordinates, naturally contains Carrollian sub-algebras in one lower dimension. The effect of the longitudinal contraction, which essentially focusses on the null direction, is to disentangle the two Carroll algebras that now correspond to the symmetries of the two null boundaries. The transverse contraction similarly separates the overlapping Galilean sub-algebras of the original Poincare algebra. We discuss aspects of the conformal case, where we get lower dimensional Carroll Conformal algebras and Schrodinger algebras.
title Anatomy of Null Contractions
topic High Energy Physics - Theory
url https://arxiv.org/abs/2406.15061