Average speed and its powers vn of a heavy quark in quarkonia

Abstract

The typical velocity of a heavy quark in a quarkonium is a widely used quantity, in this paper, based on the relativistic Bethe-Salpeter equation method, we calculate the average values |q|n and |v|n vn of a heavy quark in a S wave or P wave quarkonium rest frame, where q and v are the three dimensional momentum and velocity, n=1,2,3,4. For a charm quark in J/, we obtained vJ/=0.46, v2J/=0.26, v3J/=0.18, and v4J/=0.14, for a bottom quark in (1S), v(1S)=0.24, v2(1S)=0.072, v3(1S)=0.025, and v4(1S)=0.010. The values indicate that vn >vn1·vn2, where n1+n2=n, which is correct for all the charmonia and bottomonia. Our results also show the poor convergence if we make the speed expansion in charmonium system, but good for bottomonium. Based on the vn values and the following obtained relations vn4S > vn3S> vn2S>vn1S, vn4P > vn3P> vn2P>vn1P and vnmP>vnmS (n,m=1,2,3,4), we conclude that highly excited quarkonia have larger relativistic corrections than those of the corresponding low excited and ground states, and there are large relativistic corrections in charmonium system.