The small $K Ï$ component in the $K^*$ wave functions
arXiv:1210.7176 · doi:10.1140/epja/i2013-13022-y
Abstract
We use a recently developed formalism which generalizes the Weinberg's compositeness condition to partial waves higher than s-wave in order to determine the probability of having a $K Ï$ component in the $K^*$ wave function. A fit is made to the $K Ï$ phase shifts in p-wave, from where the coupling of $K^*$ to $K Ï$ and the $K Ï$ loop function are determined. These ingredients allow us to determine that the $K^*$ is a genuine state, different to a $K Ï$ component, in a proportion of about 80%.