Related papers: A Monte Carlo Approach to the Worldline Formalism in Curved Space

A Monte Carlo Approach to the Worldline Formalism in Curved Space

URL: http://arxiv.org/abs/2006.02911v2
Date: Fri, 23 Oct 2020 10:02:45 GMT
Title: A Monte Carlo Approach to the Worldline Formalism in Curved Space
Authors: Olindo Corradini, Maurizio Muratori
Abstract summary: We present a numerical method to evaluate worldline path integrals defined on a curved Euclidean space. We adopt an algorithm known as YLOOPS with a slight modification due to the introduction of a quadratic term. The method is tested against existing analytic calculations of the heat kernel for a free bosonic point-particle in a D-dimensional maximally symmetric space.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We present a numerical method to evaluate worldline (WL) path integrals defined on a curved Euclidean space, sampled with Monte Carlo (MC) techniques. In particular, we adopt an algorithm known as YLOOPS with a slight modification due to the introduction of a quadratic term which has the function of stabilizing and speeding up the convergence. Our method, as the perturbative counterparts, treats the non-trivial measure and deviation of the kinetic term from flat, as interaction terms. Moreover, the numerical discretization adopted in the present WLMC is realized with respect to the proper time of the associated bosonic point-particle, hence such procedure may be seen as an analogue of the time-slicing (TS) discretization already introduced to construct quantum path integrals in curved space. As a result, a TS counter-term is taken into account during the computation. The method is tested against existing analytic calculations of the heat kernel for a free bosonic point-particle in a D-dimensional maximally symmetric space.

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