English

Two-point correlation function with pion in QCD sum rules

Nuclear Theory 2009-10-31 v2 High Energy Physics - Phenomenology

Abstract

Within the framework of the conventional QCD sum rules, we study the pion two-point correlation function, id4xeiqx<0TJN(x)JˉN(0)π(p)>i\int d^4x e^{iq\cdot x} < 0| T J_N(x) {\bar J}_N(0)|\pi(p)>, beyond the soft-pion limit. We construct sum rules from the three distinct Dirac structures, iγ5\notp,iγ5,γ5σμνqμpνi \gamma_5 \notp, i \gamma_5, \gamma_5 \sigma_{\mu \nu} {q^\mu p^\nu} and study the reliability of each sum rule. The sum rule from the third structure is found to be insensitive to the continuum threshold, SπS_\pi, and contains relatively small contribution from the undetermined single pole which we denote as bb. The sum rule from the iγ5i \gamma_5 structure is very different even though it contains similar contributions from SπS_\pi and bb as the ones coming from the γ5σμνqμpν\gamma_5 \sigma_{\mu \nu} {q^\mu p^\nu} structure. On the other hand, the sum rule from the iγ5\notpi \gamma_5 \notp structure has strong dependence on both SπS_\pi and bb, which is clearly in constrast with the sum rule for γ5σμνqμpν\gamma_5 \sigma_{\mu \nu} {q^\mu p^\nu}. We identify the source of the sensitivity for each of the sum rules by making specific models for higher resonance contributions and discuss the implication.

Keywords

Cite

@article{arxiv.nucl-th/9811096,
  title  = {Two-point correlation function with pion in QCD sum rules},
  author = {Hungchong Kim and Su Houng Lee and Makoto Oka},
  journal= {arXiv preprint arXiv:nucl-th/9811096},
  year   = {2009}
}

Comments

slightly revised. version accepted for publication in Physical Review D