Hadrons in group expansion

Abstract

Various approximate symmetries exist in nature. For example, the flavor SU(4) symmetry involving the up/down/strange/charm quarks is severely broken, the flavor SU(3) symmetry involving the up/down/strange quarks is moderately broken, and the isospin SU(2) symmetry involving the up/down quarks is slightly broken. These broken symmetries are primarily governed by the strong interaction, making them an ideal platform for investigating the general behavior of approximate symmetries. To explore the application of the flavor SU(4) group to ground-state baryons, we systematically calculate the transition matrices associated with various flavor SU(4) representations as well as the matrices that describe their connections. These matrices are then employed to analyze the mass spectrum of ground-state baryons. Our results indicate that these states can be described as mixtures of various flavor representations, such as c/c/c 20M 20S 4A~[SU(4)], c/c 3A 6S~[SU(3)], 0/0 1A 3S~[SU(2)], where the subscripts S, A, and M denote the symmetric, antisymmetric, and mixed flavor wave functions, respectively. Our results also indicate that the flavor symmetries, as they break, necessitate the mixing of these flavor representations according to specific rules. For example, the approximate SU(3) flavor decuplet, with one of its flavor components slightly differing from the other two, deviates from the exact SU(3) flavor decuplet, and this deviation is characterized by the exact SU(3) flavor octet.