Inclusive Scattering

W

Semi-Inclusive Scattering

Quark distribution Functions

describe $q_v (x)$ and $\Delta q_v (x)$ here

Unpolarized

Polarized

Both models, pQCD and a hyperfine perturbed constituent quark model(CQD), show that as the scaling variable $x_{Bj}$ goes to one the double spin asymmetry $A_{1,N}$ The inclusive double polarization asymmetries $A_N$ can be written in terms of polarized $\triangle q_v (x)$ and unpolarized $q_v (x)$ valence quark distributions,

$A_{1, p}$ ^I = $\frac {4\triangle u_v (x) + \triangle d_v (x)} {4 u_v (x) + d_v (x)}$
$A_{1, n}$ ^I = $\frac {\triangle u_v (x) + 4\triangle d_v (x)} {u_v (x) + 4d_v (x)}$

The semi-inclusive pion electro-production asymmetries can be written in terms of the valence quark distributions
$A_{1, p}$ ^{$\pi^+ - \pi^-$} = $\frac {4\triangle u_v (x) - \triangle d_v (x)} {4 u_v (x) - d_v (x)}$

$A_{1,2H}$ ^{$\pi^+ - \pi^-$} = $\frac {\triangle u_v (x) + \triangle d_v (x)} { u_v (x) + d_v (x)}$

where

$A$ ^{$\pi^+ - \pi^-$} =
where $\sigma^{\pi^+ - \pi^-}$ is the measured difference of the yield from oppositely charged pions.
The semi - inclusive asymmetry can be expressed in the following way

$A_{1,2H}^{\pi^+ - \pi^-} = \frac {A^{\pi^+}} {1 + \frac {1} {R_p^{{\pi^+}/{\pi^-}}} }$ - $\frac {A^{\pi^-}} {1 + R_p^{{\pi^+}/{\pi^-}} }$

where $R_{2H}^{\pi^+/\pi^-} = \frac{\sigma^{\pi^+}} {\sigma^{\pi^-}}$ and

An asymmetry

The last equation can be expressed as

$R_{i/j}^{\pi^c} = \frac {\sigma_i ^{\pi^c}} {\sigma_j ^{\pi^c}}$

Theory

Contents

Inclusive Scattering

W

Semi-Inclusive Scattering

Quark distribution Functions

Unpolarized

Polarized

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