Understanding X(3872) and its decays in the extended Friedrichs scheme

Abstract

We present that the X(3872) could be represented as a dynamically generated state in the extended Friedrichs scheme, in which the ratio of "elementariness" and "compositeness" of the different components in the X(3872) is about Zc c:X D0 D0*: X D+ D-*: X D* D* = 1:(2.67 8.85):(0.45 0.46):0.04. Furthermore, its decays to π0 and a P-wave charmonium cJ state with J=0,1, or 2, J/π+π-, and J/π+π-π0 could be calculated out with the help of Barnes-Swanson model. The isospin breaking effects is easily understood in this scheme. This calculation also shows that the decay rate of X(3872) to c1π0 is much smaller than its decay rate to J/π+π-.