Holographic Wave Functions, Meromorphization and Counting Rules

Abstract

We study the large-Q2 behavior of the meson form factor FM (Q2) constructed using the holographic light-front wave functions proposed recently by Brodsky and de Teramond. We show that this model can be also obtained within the Migdal's regularization approach (``meromorphization''), if one applies it to 3-point function for scalar currents made of scalar quarks. We found that the asymptotic 1/Q2 behavior of FM (Q2) is generated by soft Feynman mechanism rather than by short distance dynamics, which causes very late onset of the 1/Q2 asymptotic behavior. Using meromorphization for spin-1/2 quarks, we demonstrated that resulting form factor FspinorM (Q2) has 1/Q4 asymptotic behavior. Now, owing to the late onset of this asymptotic pattern, FspinorM (Q2) imitates the 1/Q2 behavior in the few GeV2 region. We discuss analogy between meromorphization and local quark-hadron duality model for the pion form factor, and show that adding the O(αs) correction to the spectral function brings in the hard pQCD contribution that has the dimensional counting 1/Q2 behavior at large Q2. At accessible Q2, the O(αs) term is a rather small fraction of the total result. We conclude that the ``observed'' quark counting rules for hadronic form factors is an approximate phenomenon resulting from Feynman mechanism in its preasymptotic regime.

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