中文

Polarized structure function $g_2$ in the CM bag model

高能物理 - 唯象学 2014-11-17 v1

摘要

The spin-dependent structure functions g1(x)g_1(x), g2(x)g_2(x), g2WW(x){g}_2^{WW}(x) and gˉ2(x){\bar g}_2(x) and their moments are studied in the CM bag model. The results show that (i) 01g2(x)dx=0\int_0^1g_2(x)dx=0, i.e. the Burkhardt-Cottingham sum rule holds, hence g2(x)g_2(x) must have at least one non-trivial zero besides x=0x=0 and x=1x=1. (ii) 01x2g2(x)dx\int_0^1x^2g_2(x)dx is negative for the proton, neutron and deuteron. (iii) 01x2g2(x)dx\int_0^1x^2g_2(x)dx is about one order of magnitude smaller than 01x2g1(x)dx\int_0^1x^2g_1(x)dx, hence the twist-3 matrix element is approximately equal to the twist-2 matrix element. The results are compared with most recent data and predictions from the MIT bag model, lattice QCD and QCD sum rules.

引用

@article{arxiv.hep-ph/9604264,
  title  = {Polarized structure function $g_2$ in the CM bag model},
  author = {X. Song},
  journal= {arXiv preprint arXiv:hep-ph/9604264},
  year   = {2014}
}

备注

29 pages, revtex, uses epsfig.sty, 12 ps figures included