Difference between revisions of "Theory"
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==Unpolarized== | ==Unpolarized== | ||
==Polarized== | ==Polarized== | ||
− | Both models, pQCD and a hyperfine perturbed constituent quark model(CQD), show that as the scaling variable <math>x_{Bj}</math> goes to one the double spin asymmetry <math>A_{1,N}</math> is unity. On the other hand, CQM with SU(6) symmetry predicts that at <math>x_{Bj}</math> = 1 <math>A_{1,n}</math> = 5/9 for the proton, <math>A_{1,n}</math> = 0 for the neutron and <math>A_{1,d}</math> = 1/3 for the deuteron. The double spin asymmetry and the ratio of the polarized valence down quark distribution function to the unpolarized <math>({\triangle d_v} / {d_v}) </math><br> | + | Both models, pQCD and a hyperfine perturbed constituent quark model(CQD), show that as the scaling variable <math>x_{Bj}</math> goes to one the double spin asymmetry <math>A_{1,N}</math> is unity. On the other hand, CQM with SU(6) symmetry predicts that at <math>x_{Bj}</math> = 1 <math>A_{1,n}</math> = 5/9 for the proton, <math>A_{1,n}</math> = 0 for the neutron and <math>A_{1,d}</math> = 1/3 for the deuteron. The double spin asymmetry and the ratio of the polarized valence down quark distribution function to the unpolarized <math>({\triangle d_v} / {d_v}) can give knowledge of this two different results </math><br> |
The inclusive double polarization asymmetries <math>A_N</math> can be written in terms of polarized <math>\triangle q_v (x)</math> and unpolarized <math> q_v (x)</math> valence quark distributions, | The inclusive double polarization asymmetries <math>A_N</math> can be written in terms of polarized <math>\triangle q_v (x)</math> and unpolarized <math> q_v (x)</math> valence quark distributions, | ||
Revision as of 20:29, 18 July 2007
Inclusive Scattering
W
Semi-Inclusive Scattering
Quark distribution Functions
describe
and hereUnpolarized
Polarized
Both models, pQCD and a hyperfine perturbed constituent quark model(CQD), show that as the scaling variable
The inclusive double polarization asymmetries can be written in terms of polarized and unpolarized valence quark distributions,
I =
I =
The semi-inclusive pion electro-production asymmetries can be written in terms of the valence quark distributions
=
=
where
where is the measured difference of the yield from oppositely charged pions.
The semi - inclusive asymmetry can be expressed in the following way
where
An asymmetry
The last equation can be expressed as