J. Hořejší scite author profile

The widely used nonperturbative wave functions and distribution functions of QCD are determined as matrix elements of light-ray operators. These operators appear as large momentum limit of nonlocal hadron operators or as summed up local operators in light-cone expansions. Nonforward one-particle matrix elements of such operators lead to new distribution amplitudes describing both hadrons simultaneously. These distribution functions depend besides other variables on two scaling variables. They are applied for the description of exclusive virtual Compton scattering in the Bjorken region near forward direction and the two meson production process. The evolution equations for these distribution amplitudes are derived on the basis of the renormalization group equation of the considered operators. This includes that also the evolution kernels follow from the anomalous dimensions of these operators. Relations between different evolution kernels (especially the Altarelli-Parisi and the Brodsky-Lepage) kernels are derived and explicitly checked for the existing two-loop calculations of QCD. Technical basis of these results are support and analytically properties of the anomalous dimensions of light-ray operators obtained with the help of the α-representation of Green's functions.

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The Altarelli-Parisi kernel as asymptotic limit of an extended Brodsky-Lepage kernel

Dittes

et al. 1988

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Dispersive approach to the axial anomaly, the t'Hooft's principle and QCD sum rules

Hořejší

Teryaev²

1995

Z. Phys. C - Particles and Fields

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Nonlocal light-cone expansions and evolution equations

Geyer

Robaschik

Bordag

et al. 1985

Z. Phys. C - Particles and Fields

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Tree-unitarity bounds for THDM Higgs masses revisited

2006

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We have reconsidered theoretical upper bounds on the scalar boson masses within the two-Higgs-doublet model (THDM), employing the well-known technical condition of tree-level unitarity. Our treatment provides a modest extension and generalization of some previous results of other authors. We present a rather detailed discussion of the solution of the relevant inequalities and offer some new analytic formulae as well as numerical values for the Higgs mass bounds in question. A comparison is made with the earlier results on the subject that can be found in the literature.

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J. Hořejší

Wave Functions, Evolution Equations and Evolution Kernels from Light-Ray Operators of QCD

The Altarelli-Parisi kernel as asymptotic limit of an extended Brodsky-Lepage kernel

Dispersive approach to the axial anomaly, the t'Hooft's principle and QCD sum rules

Nonlocal light-cone expansions and evolution equations

Tree-unitarity bounds for THDM Higgs masses revisited

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