Litcius/Paper detail

Fermion sign problem in path integral Monte Carlo simulations: grand-canonical ensemble

Tobias Dornheim

2021Journal of Physics A Mathematical and Theoretical35 citationsDOIOpen Access PDF

Abstract

Abstract We present a practical analysis of the fermion sign problem in fermionic path integral Monte Carlo (PIMC) simulations in the grand-canonical ensemble (GCE). As a representative model system, we consider electrons in a 2D harmonic trap. We find that the sign problem in the GCE is even more severe than in the canonical ensemble at the same conditions, which, in general, makes the latter the preferred option. Despite these difficulties, we show that fermionic PIMC simulations in the GCE are still feasible in many cases, which potentially gives access to important quantities like the compressibility or the Matsubara Greens function. This has important implications for contemporary fields of research such as warm dense matter, ultracold atoms, and electrons in quantum dots.

Topics & Concepts

FermionCanonical ensembleGrand canonical ensemblePath integral formulationSign (mathematics)PhysicsPath integral Monte CarloQuantum Monte CarloElectronMonte Carlo methodStatistical physicsMicrocanonical ensemblePath (computing)Quantum mechanicsQuantumQuantum electrodynamicsMathematicsComputer scienceStatisticsMathematical analysisProgramming languageQuantum, superfluid, helium dynamicsCold Atom Physics and Bose-Einstein CondensatesPhysics of Superconductivity and Magnetism