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RESEARCH PRODUCT
A new lattice action for studying topological charge
Raman SundrumPilar Hernándezsubject
InstantonNuclear and High Energy PhysicsHigh Energy Physics::LatticeLattice field theoryFOS: Physical sciencesTheoretical physicsLattice constantHigh Energy Physics - LatticeHamiltonian lattice gauge theoryLattice (order)Lattice gauge theoryCovariant transformationGauge theoryScalingTopological quantum numberMathematicsPhysicsQuantum gauge theoryNumerical analysisHigh Energy Physics - Lattice (hep-lat)FísicaLattice QCDMap of latticesAtomic and Molecular Physics and OpticsReciprocal latticeQuantum electrodynamicsLattice model (physics)description
We propose a new lattice action for non-abelian gauge theories, which will reduce short-range lattice artifacts in the computation of the topological susceptibility. The standard Wilson action is replaced by the Wilson action of a gauge covariant interpolation of the original fields to a finer lattice. If the latter is fine enough, the action of all configurations with non-zero topological charge will satisfy the continuum bound. As a simpler example we consider the $O(3)$ $\sigma$-model in two dimensions, where a numerical analysis of discretized continuum instantons indicates that a finer lattice with half the lattice spacing of the original is enough to satisfy the continuum bound.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 1996-04-12 | Nuclear Physics B - Proceedings Supplements |