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q deformed formulation of Hamiltonian SU(3) Yang-Mills theory

Tomoya Hayata, Yoshimasa Hidaka

2023Journal of High Energy Physics22 citationsDOIOpen Access PDF

Abstract

A bstract We study SU(3) Yang-Mills theory in (2 + 1) dimensions based on networks of Wilson lines. With the help of the q deformation, networks respect the (discretized) SU(3) gauge symmetry as a quantum group, i.e., SU(3) k , and may enable implementations of SU(3) Yang-Mills theory in quantum and classical algorithms by referring to those of the stringnet model. As a demonstration, we perform a mean-field computation of the groundstate of SU(3) k Yang-Mills theory, which is in good agreement with the conventional Monte Carlo simulation by taking sufficiently large k . The variational ansatz of the mean-field computation can be represented by the tensor networks called infinite projected entangled pair states. The success of the mean-field computation indicates that the essential features of Yang-Mills theory are well described by tensor networks, so that they may be useful in numerical simulations of Yang-Mills theory.

Topics & Concepts

AnsatzPhysicsYang–Mills theoryYang–Mills existence and mass gapMathematical physicsComputationGauge theoryHamiltonian (control theory)Special unitary groupGauge symmetryDiscretizationAuxiliary fieldTensor (intrinsic definition)Symmetry groupQuantum mechanicsMathematicsGeometryMathematical analysisAlgorithmMathematical optimizationBlack Holes and Theoretical PhysicsQuantum many-body systemsPhysics of Superconductivity and Magnetism
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