Perturbative renormalization of GPDs to O(a^2), for various fermion/gluon actions

Details Perturbative renormalization of GPDs to O(a^2), for various fermion/gluon actions Perturbative renormalization of GPDs to O(a^2), for various fermion/gluon actions

2010-01-10

arxiv.org/abs/1001.1498v1

PoS LAT2009:205,2009

Physics

High Energy Physics

High Energy Physics - Lattice

7 pages, 2 figures. Presented at the "XXVII International Symposium on Lattice Field Theory", July 26-31 2009, Peking Universi

Scientific paper

We present a 1-loop perturbative calculation of the fermion propagator, up to O(a^2) (a: lattice spacing). The fermions are described by Wilson, clover and twisted-mass actions; for gluons we use Symanzik improved actions (Plaquette, Tree-level Symanzik, Iwasaki, TILW, DBW2). Our results are given in a general covariant gauge, and their dependence on the coupling constant, the external momentum, the masses and the clover parameter is shown explicitly. We also study the O(a^2) corrections to matrix elements of unpolarized/polarized fermion bilinear operators, which include up to one derivative. These corrections are essential ingredients for improving, to O(a^2), the renormalization constants of the operators under study. In addition, they can be used to minimize lattice artifacts in non-perturbative studies.

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