An $N$-independent tensor decomposition for SU($N$)
Published: Jul 30, 2025
Last Updated: Jul 30, 2025
Authors:Stefan Keppeler, Malin Sjodahl, Bernanda Telalovic
Abstract
To facilitate a simultaneous treatment of an arbitrary number of colors in representation theory-based descriptions of QCD color structure, we derive an $N$-independent reduction of SU($N$) tensor products. To this end, we label each irreducible representation by a pair of Young diagrams, with parts acting on quarks and antiquarks. By combining this with a column-wise multiplication of Young diagrams, we generalize the Littlewood-Richardson rule for the product of two Young diagrams to the product of two Young diagram pairs, achieving a general-$N$ decomposition.