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Amplitudes for the Exotic b1π Decay (view source)
Revision as of 20:18, 12 August 2011
, 20:18, 12 August 2011→Isospin Projections
One must also take into account the various ways that the isospin of the daughters can add up to the isospin quantum numbers of the parent, requiring a term:
One must also take into account the various ways that the isospin of the daughters can add up to the isospin quantum numbers of the parent, requiring a term:
<math>
:<math>
C^{a,b} =
C^{a,b} =
\left(\begin{array}{cc|c}
\left(\begin{array}{cc|c}
where ''a=1'' and ''b=2'', referring to the daughter number. Because an even-symmetric angular wave function (i.e. ''L=0,2...'') imply that 180 degree rotation is equivalent to reversal of daughter identities (''a,b'' becoming ''b,a'') one must write down the symmetrized expression:
where ''a=1'' and ''b=2'', referring to the daughter number. Because an even-symmetric angular wave function (i.e. ''L=0,2...'') imply that 180 degree rotation is equivalent to reversal of daughter identities (''a,b'' becoming ''b,a'') one must write down the symmetrized expression:
<math>
:<math>
C(L)=\frac{1}{\sqrt{2}} \left[ C^{a,b} + (-1)^L C^{b,a} \right]
C(L)=\frac{1}{\sqrt{2}} \left[ C^{a,b} + (-1)^L C^{b,a} \right]
</math>
</math>