# Orbital Angular Momentum at Small $x$

**Authors:** Yuri V. Kovchegov

arXiv: 1901.07453 · 2019-05-01

## TL;DR

This paper derives the small-$x$ asymptotics of quark and gluon orbital angular momentum distributions in the proton using double-logarithmic approximation, relating them to polarized dipole amplitudes and their evolution equations.

## Contribution

It provides the first derivation of small-$x$ asymptotics for quark and gluon OAM distributions in the large-$N_c$ limit, connecting them to polarized dipole amplitudes and their evolution.

## Key findings

- Quark OAM distribution scales as (1/x)^{4/√3 √(α_s N_c/2π)}.
- Gluon OAM distribution scales as (1/x)^{13/4√3 √(α_s N_c/2π)}.
- Established relations between OAM and polarized dipole amplitudes at small x.

## Abstract

We determine the small Bjorken $x$ asymptotics of the quark and gluon orbital angular momentum (OAM) distributions in the proton in the double-logarithmic approximation (DLA), which resums powers of $\alpha_s \ln^2 (1/x)$ with $\alpha_s$ the strong coupling constant. Starting with the operator definitions for the quark and gluon OAM, we simplify them at small $x$, relating them, respectively, to the polarized dipole amplitudes for the quark and gluon helicities defined in our earlier works. Using the small-$x$ evolution equations derived for these polarized dipole amplitudes earlier we arrive at the following small-$x$ asymptotics of the quark and gluon OAM distributions in the large-$N_c$ limit:   \begin{align}   L_{q + \bar{q}} (x, Q^2) = - \Delta \Sigma (x, Q^2) \sim   \left(\frac{1}{x}\right)^{\frac{4}{\sqrt{3}} \, \sqrt{\frac{\alpha_s   \, N_c}{2 \pi}} }, \ \ \ \ \   L_G (x, Q^2) \sim \Delta G (x, Q^2) \sim   \left(\frac{1}{x}\right)^{\frac{13}{4 \sqrt{3}} \, \sqrt{\frac{\alpha_s   \, N_c}{2 \pi}}} . \end{align}

## Full text

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## References

57 references — full list in the complete paper: https://tomesphere.com/paper/1901.07453/full.md

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