Monte Carlo sampling of complex actions in extended state spaces
Abstract
Path integrals with complex actions are encountered for many physical systems ranging from spin or massimbalanced atomic gases and graphene to quantum chromodynamics at finite density to the nonequilibrium evolution of quantum systems. Many computational approaches have been developed for tackling the sign problem emerging for complex actions. Among these, complex Langevin dynamics has the appeal of general applicability. One of its key challenges is the potential convergence of the dynamics to unphysical fixed points. The statistical sampling process at such a fixed point is not based on the physical action and hence leads to wrong predictions. Moreover, its unphysical nature is hard to detect due to the implicit nature of the process. In the present work we set up a general approach based on a Markov chain Monte Carlo scheme in an extended state space. In this approach we derive an explicit real sampling process for generalized complex Langevin dynamics. Subject to a set of constraints, this sampling process is the physical one. These constraints originate from the detailedbalance equations satisfied by the Monte Carlo scheme. This allows us to rederive complex Langevin dynamics from a new perspective and establishes a framework for the explicit construction of new sampling schemes for complex actions.
 Publication:

Physical Review E
 Pub Date:
 April 2022
 DOI:
 10.1103/PhysRevE.105.045315
 arXiv:
 arXiv:2106.09367
 Bibcode:
 2022PhRvE.105d5315K
 Keywords:

 High Energy Physics  Lattice;
 High Energy Physics  Theory;
 Mathematical Physics;
 Statistics  Computation
 EPrint:
 29 pages, 9 figures