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Abstract
We carry out a systematic study of primary operators in the conformal field theory of a free Weyl fermion. Using SO(4, 2) characters we develop counting formulas for primaries constructed using a fixed number of fermion fields. By specializing to particular classes of primaries, we derive very explicit formulas giving the generating functions for the number of primaries in these classes. We present a duality map between primary operators in the fermion field theory and polynomial functions. This allows us to construct the primaries that were counted. Next we show that these classes of primary fields correspond to polynomial functions on certain permutation orbifolds. These orbifolds have palindromic Hilbert series.
Details
Title
From spinning primaries to permutation orbifolds
Author
de Mello Koch, Robert 1 ; Rabambi, Phumudzo 2 ; Hendrik J R Van Zyl 2
1 School of Physics and Telecommunication Engineering, South China Normal University, Guangzhou, China; National Institute for Theoretical Physics, School of Physics and Mandelstam Institute for Theoretical Physics, University of the Witwatersrand, Wits, South Africa
2 National Institute for Theoretical Physics, School of Physics and Mandelstam Institute for Theoretical Physics, University of the Witwatersrand, Wits, South Africa
1 School of Physics and Telecommunication Engineering, South China Normal University, Guangzhou, China; National Institute for Theoretical Physics, School of Physics and Mandelstam Institute for Theoretical Physics, University of the Witwatersrand, Wits, South Africa
2 National Institute for Theoretical Physics, School of Physics and Mandelstam Institute for Theoretical Physics, University of the Witwatersrand, Wits, South Africa
Pages
1-25
Publication year
2018
Publication date
Apr 2018
e-ISSN
10298479
Source type
Scholarly Journal
Language of publication
English
ProQuest document ID
2027552105
Copyright
Journal of High Energy Physics is a copyright of Springer, (2018). All Rights Reserved.