0000000000787702

AUTHOR

Rudy Arthur

showing 1 related works from this author

Covariant approximation averaging

2015

We present a new class of statistical error reduction techniques for Monte-Carlo simulations. Using covariant symmetries, we show that correlation functions can be constructed from inexpensive approximations without introducing any systematic bias in the final result. We introduce a new class of covariant approximation averaging techniques, known as all-mode averaging (AMA), in which the approximation takes account of contributions of all eigenmodes through the inverse of the Dirac operator computed from the conjugate gradient method with a relaxed stopping condition. In this paper we compare the performance and computational cost of our new method with traditional methods using correlation…

PhysicsNuclear and High Energy PhysicsHigh Energy Physics::LatticeMonte Carlo methodLattice field theoryHigh Energy Physics - Lattice (hep-lat)FOS: Physical sciencesLattice QCDDirac operatorsymbols.namesakeHigh Energy Physics - LatticeConjugate gradient methodLattice gauge theoryQuantum mechanicssymbolsCovariant transformationVector mesonMathematical physics
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