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Worldvolume approach to the tempered Lefschetz thimble method

Masafumi Fukuma, Nobuyuki Matsumoto

2021Progress of Theoretical and Experimental Physics31 citationsDOIOpen Access PDF

Abstract

Abstract As a solution towards the numerical sign problem, we propose a novel hybrid Monte Carlo algorithm, in which molecular dynamics is performed on a continuum set of integration surfaces foliated by the antiholomorphic gradient flow (“the worldvolume of an integration surface”). This is an extension of the tempered Lefschetz thimble method (TLTM) and solves the sign and multimodal problems simultaneously, as the original TLTM does. Furthermore, in this new algorithm, one no longer needs to compute the Jacobian of the gradient flow in generating a configuration, and only needs to evaluate its phase upon measurement. To demonstrate that this algorithm works correctly, we apply the algorithm to a chiral random matrix model, for which the complex Langevin method is known not to work.

Topics & Concepts

Jacobian matrix and determinantPhysicsBalanced flowExtension (predicate logic)Sign (mathematics)Applied mathematicsFlow (mathematics)Numerical integrationMatrix (chemical analysis)Monte Carlo methodSet (abstract data type)Mathematical physicsLangevin dynamicsPhase (matter)AlgorithmStatistical physicsHybrid Monte CarloLimit (mathematics)Algebra over a fieldPure mathematicsNumerical analysisMonte Carlo integrationMathematical analysisRandom matrixAffine transformationMarkov Chains and Monte Carlo MethodsRandom Matrices and ApplicationsQuantum chaos and dynamical systems
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