Hidden-charm uds\,c c pentaquarks as flavor eigenstates in a constituent quark model

Abstract

We use a diffusion Monte Carlo (DMC) algorithm to solve the Schr\"odinger equation that describes udsc c pentaquarks within the framework of a non-relativistic constituent quark model. We considered only multiquark states with defined values of parity, color, spin and isospin, selected to be compatible with the experimentally favored assignment JP=1/2- for one of the candidates, and assumed I=0. However, we found that, to explain the existence of the Pcs(4338) and Pcs(4459) pentaquarks, we need the total wavefunction to be also an eigenvector of the SU(3) flavor operator. When we impose that condition, we obtain two structures compatible with the masses extracted from the J/ spectrum. In addition, two states are predicted below the J/ threshold but above the ηc one that would not appear in that channel. If we only impose the I=0 condition, we obtain a single (not two) structure compatible with the experimental quantum numbers, with a mass below the J/ threshold.