Your search keyword '"generalized parton distribution [nucleon]"' showing total 2 results

1. Generalised parton distributions from the off-forward Compton amplitude in lattice QCD

Author

Hannaford-Gunn, Alec, Can, Kadir Utku, CSSM/QCDSF/UKQCD Collaboration, Horsley, Roger, Nakamura, Yoshifumi, Perlt, Holger, Rakow, Paul E. L., Stüben, Hinnerk, Schierholz, Gerrit, Young, Ross D., and Zanotti, James M.

Subjects

pi, mass, FOS: Physical sciences, parton: distribution function, GeV, mass [pi], operator product expansion, 01 natural sciences, pi: mass, High Energy Physics - Lattice, 0103 physical sciences, ddc:530, 010306 general physics, Nuclear Experiment, lattice, form factor, parton, distribution function, nucleon, generalized parton distribution, 010308 nuclear & particles physics, High Energy Physics - Lattice (hep-lat), momentum transfer, lattice field theory, nucleon: generalized parton distribution, background field, kinematics, propagator, distribution function [parton], generalized parton distribution [nucleon]

Abstract

Physical review / D 105(1), 014502 (2022). doi:10.1103/PhysRevD.105.014502, We determine the properties of generalized parton distributions (GPDs) from a lattice QCD calculation of the off-forward Compton amplitude (OFCA). By extending the Feynman-Hellmann relation to second-order matrix elements at off-forward kinematics, this amplitude can be calculated from lattice propagators computed in the presence of a background field. Using an operator product expansion, we show that the deeply virtual part of the OFCA can be parametrized in terms of the low-order Mellin moments of the GPDs. We apply this formalism to a numerical investigation for zero-skewness kinematics at two values of the soft momentum transfer, $t=-1.1,-2.2 GeV^2$, and a pion mass of $m_�����470 MeV$. The form factors of the lowest two moments of the nucleon GPDs are determined, including the first lattice QCD determination of the n=4 moments. Hence we demonstrate the viability of this method to calculate the OFCA from first principles, and thereby provide novel constraint on the x- and t-dependence of GPDs., Published by Inst., Melville, NY

Published

2021

2. Moments of nucleon generalized parton distributions from lattice QCD simulations at physical pion mass

Author

Constantia Alexandrou, Simone Bacchio, Karl Jansen, Martha Constantinou, R. Frezzotti, Jacob Finkenrath, Carsten Urbach, Bartosz Kostrzewa, C. Lauer, Petros Dimopoulos, Kyriakos Hadjiyiannakou, and Giannis Koutsou

Subjects

Nuclear Theory, High Energy Physics::Lattice, Parton, 01 natural sciences, High Energy Physics - Experiment, High Energy Physics - Experiment (hep-ex), High Energy Physics - Phenomenology (hep-ph), excited state, ground state, Nuclear Experiment, lattice, Physics, form factor, Settore FIS/02, momentum transfer, High Energy Physics - Lattice (hep-lat), lattice field theory, axial-vector, Lattice QCD, mass dependence [quark], High Energy Physics - Phenomenology, Nucleon, distribution function [parton], generalized parton distribution [nucleon], Quark, Particle physics, isovector, FOS: Physical sciences, Charm quark, renormalization, Nuclear Theory (nucl-th), Pion, High Energy Physics - Lattice, 0103 physical sciences, quantum chromodynamics, ddc:530, flavor: 2 [quark], 010306 general physics, numerical calculations, Isovector, mass: twist [quark], 010308 nuclear & particles physics, High Energy Physics::Phenomenology, flavor: 4 [quark], helicity, Distribution function, effect [finite size], High Energy Physics::Experiment, charm, vector

Abstract

We present results for the moments of nucleon isovector vector and axial generalised parton distribution functions computed within lattice QCD. Three ensembles of maximally twisted mass clover-improved fermions simulated with a physical value of the pion mass are analyzed. Two of these ensembles are generated using two degenerate light quarks. A third ensemble is used having, in addition to the light quarks, strange and charm quarks in the sea. A careful analysis of the convergence to the ground state is carried out that is shown to be essential for extracting the correct nucleon matrix elements. This allows a controlled determination of the unpolarised, helicity and tensor second Mellin moments. The vector and axial-vector generalised form factors are also computed as a function of the momentum transfer square up to about 1 GeV$^2$. The three ensembles allow us to check for unquenching effects and to assess lattice finite volume effects., Comment: Published version. Typos corrected, references and figures added. 22 pages, 17 figures

Published

2020