322 CHAPTER 5. ELEMENTARY PARTICLES
Theorem 5.21.The following assertions hold true for the w∗-color algebra:
1) For any gluon particle system with no quarks and antiquarks(5.5.38) π=4
∑
i= 1(migi+migi),the color index of this system satisfies that(5.5.39) Indc(π) =
w for3
∑
i= 1(mi−mi) =± 3 n,y for3
∑
i= 1(mi−mi) =± 3 n+ 1 ,y for3
∑
i= 1(mi−mi) =± 3 n+ 2 ,for some integer n= 0 , 1 , 2 ,···;2) For any single quark system as(5.5.40)
ω=q+π
ω=q+π
withπas given by (5.5.38),the color index of (5.5.40) satisfies that(5.5.41)
Indc(ω) =r,g,b,
Indc(ω) =r,g,b,3) For the hadronic systems(5.5.42)
M=q+q+π meson system,
B=q+q+q+π baryon system,withπgiven by (5.5.38), the color indices of (5.5.42) must be as(5.5.43) Indc(M) =w,y,y, Indc(B) =w,y,y.Two remarks are now in order.
First, in particle physics, all basic and important particle systems are given by the parti-
cle systems in Assertions 1)-3) in this theorem. System (5.5.38) represents a gluon system
attached to quarks and hadrons, (5.5.40) represents a cloud system of gluons around a quark
or an anti-quark, and (5.5.42) represents a cloud system of gluons around a hadron (a meson
or a baryon).
Second, physically, the numbers
3
∑
i= 1(mi−mi) =± 3 n (n= 0 , 1 , 2 ,···),indicate that through exchange of weaktons, a cloud system (5.5.38) of gluons can become a
system consisting of white gluons and the same number of yellow and anti-yellow gluons.