Parlyne said:
These statements are independent of spin-statistics. They apply just as well to squarks (if they exist) as to quarks. So, there really was no ambiguity to my statement.
Well, you said that for a boson you must need a fully symmetric wavefunction, for a fermion a fully antisymmetric. I am sorry I was confused because of it, I apologize.
This is related to my question on antiparticles, ie in which sense -R-B is +G. Point is, you must to use the decomposition of representations
\bar 3 \otimes \bar 3 = \bar 6 \oplus 3
and choose 6 or 3 depending if you wish symmetry or antisymmetry. So while both cases are combinations, in one case you get again the fundamental representation. I do not remember if it is the symmetric or the antisymmetric case.
For three quarks it is more complicated because \bar 3 \otimes 3 = 8 \oplus 1 so
3 \otimes 3 \otimes 3 = ( 6 \oplus \bar 3) \otimes 3 = ( 6 \otimes 3) \oplus ( \bar 3 \otimes 3) = ( 6 \otimes 3) \oplus 8 \oplus 1 = 10 \oplus 8 \oplus 8 \oplus 1
Well there is the singlet combination, yes, which is going to be the sum you told above. And according
http://en.wikipedia.org/wiki/Quark_model
"The decuplet is symmetric ... the singlet antisymmetric and the two octets have mixed symmetry."
as you said.
So OK, you need to get antisymmetry to get the singlet. It is amusing that some particles in the colour decuplets and octets are not to be considered white.
Edit: I see I am basically repeating your argument. Still I think that the case of two quarks to do an antiquark (or reciprocally) is interesting and it deserved some lines, so I have fitted it here.
. Let's define a quantum "object" as an entity fulfilling the spin-statistics rule, ie fully symmetrc if it is a boson, fully antisymetric if it is a fermion.