Stochastic renormalization group and gradient flow
Andrea Carosso
Abstract
A bstract A non-perturbative and continuous definition of RG transformations as stochastic processes is proposed, inspired by the observation that the functional RG equations for effective Boltzmann factors may be interpreted as Fokker-Planck equations. The result implies a new approach to Monte Carlo RG that is amenable to lattice simulation. Long-distance correlations of the effective theory are shown to approach gradient-flowed correlations, which are simpler to measure. The Markov property of the stochastic RG transformation implies an RG scaling formula which allows for the measurement of anomalous dimensions when transcribed into gradient flow expectation values.
Topics & Concepts
PhysicsRenormalization groupStatistical physicsBalanced flowScalingFunctional renormalization groupFlow (mathematics)Lattice (music)Mathematical physicsMonte Carlo methodMarkov chainGroup (periodic table)Boltzmann constantMarkov processMarkov propertyTransformation (genetics)Stochastic processCanonical transformationLattice model (finance)Lattice Boltzmann methodsCritical phenomenaApplied mathematicsProperty (philosophy)Statistical Mechanics and EntropyTheoretical and Computational PhysicsAdvanced Thermodynamics and Statistical Mechanics