Schwinger-Dyson equations and line integrals
Abstract
The Complex Langevin (CL) method sometimes shows convergence to the wrong limit, even though the Schwinger-Dyson Equations (SDE) are fulfilled. We analyze this problem in a more general context for the case of one complex variable. We prove a theorem that shows that under rather general conditions not only the equilibrium measure of CL but any linear functional satisfying the SDE on a space of test functions is given by a linear combination of integrals along paths connecting the zeroes of the underlying measure and noncontractible closed paths. This proves rigorously a conjecture stated long ago by one us (L.~L.~S.) and explains a fact observed in nonergodic cases of CL. one us (L.~L.~S.) and explains a fact observed in nonergodic cases of CL.
Cite
@article{arxiv.1809.06888,
title = {Schwinger-Dyson equations and line integrals},
author = {Lorenzo Luis Salcedo and Erhard Seiler},
journal= {arXiv preprint arXiv:1809.06888},
year = {2018}
}
Comments
32 pages