Litcius/Paper detail

Reconstructing QCD spectral functions with Gaussian processes

Jan Horak, Jan M. Pawlowski, J. Rodrı́guez-Quintero, Jonas Turnwald, Julian M. Urban, Nicolas Wink, Savvas Zafeiropoulos

2022Physical review. D/Physical review. D.71 citationsDOIOpen Access PDF

Abstract

We reconstruct ghost and gluon spectral functions in $2+1$ flavor QCD with Gaussian process regression. This framework allows us to largely suppress spurious oscillations and other common reconstruction artifacts by specifying generic magnitude and length scale parameters in the kernel function. The Euclidean propagator data are taken from lattice simulations with domain wall fermions at the physical point. For the infrared and ultraviolet extensions of the lattice propagators as well as the low-frequency asymptotics of the ghost spectral function, we utilize results from functional computations in Yang-Mills theory and QCD. This further reduces the systematic error significantly. Our numerical results are compared against a direct real-time functional computation of the ghost and an earlier reconstruction of the gluon in Yang-Mills theory. The systematic approach presented in this work offers a promising route toward unveiling real-time properties of QCD.

Topics & Concepts

PropagatorQuantum chromodynamicsLattice QCDPhysicsSpurious relationshipLattice (music)Euclidean geometryComputationGaussianParticle physicsGaussian functionStatistical physicsAlgorithmMathematicsComputer scienceMathematical physicsQuantum mechanicsGeometryMachine learningAcousticsHigh-Energy Particle Collisions ResearchParticle physics theoretical and experimental studiesQuantum Chromodynamics and Particle Interactions