Shen712 said:
The composition of the π0 is (uu_bar - dd_bar/√2; while the composition of the η meson is (uu_bar + dd_bar)/√2. Why is there a - sign in π0 while is there a + sign in η? How are the signs determined?
By the way, can I type Latex symbols on this site? I tried to type the anti up quark by typing \overline{u}, but it did not show what I wanted. How should I type it?
Where is the s \bar{s} component of your \eta? Scalar mesons (i.e., the J^{P} = 0^{-} representation of the Lorentz group) contain 2 \eta-particles: the T = S = 0 member of the SU(3) octet, usually denoted by \eta_{8} and having the quarks content \eta_{8} = \frac{1}{\sqrt{6}} (u \bar{u} + d \bar{d} - 2 s \bar{s}) , and there is the SU(3) singlet (invariant) state \eta_{1} = \frac{1}{\sqrt{3}} \sum_{i = u,d,s} q^{i} \ \bar{q}_{i} = \frac{1}{\sqrt{3}} (u \bar{u} + d \bar{d} + s \bar{s}) \ . The exact quark content follows from the SU(3) decomposition 3 \otimes \bar{3} = 8 \oplus 1, which you can represent as follow q^{i} \bar{q}_{j} = \left( q^{i} \bar{q}_{j} - \frac{1}{3} \delta^{i}_{j} \sum_{k = u,d,s} q^{k} \bar{q}_{k}\right) + \frac{1}{3} \delta^{i}_{j} \sum_{k} q^{k}\bar{q}_{k} \ . The first term on the right hand side is the 3 \times 3 traceless hermitian mesons matrix \{8\}^{i}_{j} = q^{i} \bar{q}_{j} - \frac{1}{3} \delta^{i}_{j} \sum_{k = u,d,s} q^{k} \bar{q}_{k} \ . For the 0^{-} (i.e., scalar) mesons, the off-diagonal matrix elements are easily recognised, for example \{8\}^{2}_{3} = d \bar{s} = K^{0} \ , \{8\}^{3}_{1} = s \bar{u} = K^{-} and the two charged pions \{8\}^{1}_{2} = u \bar{d} = \pi^{+} \ , \{8\}^{2}_{1} = d \bar{u} = \pi^{-}. Now, before considering the diagonal elements of the SU(3) meson matrix \{8\}^{i}_{j}, and in order to settle the sign issue for \pi^{0}, let us repeat the same thing for the iso-spin group SU(2). That is decomposing the tensor product 2 \otimes 2 = 3 \oplus 1 by subtracting the SU(2)-invariant trace. So, in terms of quarks q^{m} \bar{q}_{n} = \left( q^{m} \bar{q}_{n} - \frac{1}{2} \delta^{m}_{n} \sum_{l = u,d} q^{l}\bar{q}_{l} \right) + \frac{1}{2} \delta^{m}_{n} \sum_{l = u,d} q^{l} \bar{q}_{l} \ . From this we identify the triplet (i.e., iso-spin one) pion states which are contained in the matrix \{3\}^{m}_{n}:\pi^{+} = |1 , +1\rangle = \{3\}^{1}_{2} = u \bar{d} \ ,\pi^{0} = |1 , 0 \rangle = \sqrt{2} \{3\}^{1}_{1} = \frac{1}{\sqrt{2}} (u \bar{u} - d \bar{d}) \ ,\pi^{-} = |1 , -1 \rangle = \{3\}^{2}_{1} = d \bar{u} \ . Now, you know the exact form of \pi^{0} state, go back to consider the diagonal elements of the SU(3) matrix \{8\}^{i}_{j}: \{8\}^{1}_{1} = u \bar{u} - \frac{1}{3} \sum_{j = u,d,s} q^{j}\bar{q}_{j} = \frac{1}{\sqrt{2}} \pi^{0} + \frac{1}{6} \left( u \bar{u} + d \bar{d} - 2 s \bar{s} \right) \ , \{8\}^{2}_{2} = - \frac{1}{\sqrt{2}} \pi^{0} + \frac{1}{6} \left( u \bar{u} + d \bar{d} - 2 s \bar{s} \right) \ ,\{8\}^{3}_{3} = - \frac{2}{6} \left( u \bar{u} + d \bar{d} - 2 s \bar{s}\right) \ . This led to the identification of \eta_{8} with the state \eta_{8} = \frac{1}{\sqrt{6}} \left( u \bar{u} + d \bar{d} - 2 s \bar{s}\right) \ .
