Type

Journal Article

Authors

Michael James Peardon

Subjects

Mathematics

Topics
dependence finite volume vacuum improvement quantum pure applied mathematics elements anisotropic lattices

Glueball spectrum and matrix elements on anisotropic lattices (2006)

Abstract The glueball-to-vacuum matrix elements of local gluonic operators in scalar, tensor, and pseudoscalar channels are investigated numerically on several anisotropic lattices with the spatial lattice spacing ranging from 0.1?0.2 fm. These matrix elements are needed to predict the glueball branching ratios in J= radiative decays which will help identify the glueball states in experiments. Two types of improved local gluonic operators are constructed for a self-consistent check and the finite-volume effects are studied. We find that lattice spacing dependence of our results is very weak and the continuum limits are reliably extrapolated, as a result of improvement of the lattice gauge action and local operators. We also give updated glueball masses with various quantum numbers.
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Full list of authors on original publication

Michael James Peardon

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Michael James Peardon
Trinity College Dublin
Total Publications: 64