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Bootstrap, Markov Chain Monte Carlo, and LP/SDP hierarchy for the lattice Ising model

Minjae Cho, Xin Sun

2023Journal of High Energy Physics12 citationsDOIOpen Access PDF

Abstract

A bstract Bootstrap is an idea that imposing consistency conditions on a physical system may lead to rigorous and nontrivial statements about its physical observables. In this work, we discuss the bootstrap problem for the invariant measure of the stochastic Ising model defined as a Markov chain where probability bounds and invariance equations are imposed. It is described by a linear programming (LP) hierarchy whose asymptotic convergence is shown by explicitly constructing the invariant measure from the convergent sequence of moments. We also discuss the relation between the LP hierarchy for the invariant measure and a recently introduced semidefinite programming (SDP) hierarchy for the Gibbs measure of the statistical Ising model based on reflection positivity and spin-flip equations.

Topics & Concepts

Ising modelInvariant measureMarkov chainGibbs measureApplied mathematicsPhysicsStatistical physicsMeasure (data warehouse)Probability measureSemidefinite programmingMathematicsMonte Carlo methodInvariant (physics)Mathematical physicsPure mathematicsDiscrete mathematicsMathematical optimizationComputer scienceStatisticsErgodic theoryDatabaseMarkov Chains and Monte Carlo MethodsProtein Structure and DynamicsTheoretical and Computational Physics
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