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Excitations with projected entangled pair states using the corner transfer matrix method

Boris Ponsioen, Philippe Corboz

2020Physical review. B./Physical review. B57 citationsDOIOpen Access PDF

Abstract

We present an extension of a framework for simulating single quasiparticle or collective excitations on top of strongly correlated quantum many-body ground states using infinite projected entangled pair states, a tensor network ansatz for two-dimensional wave functions in the thermodynamic limit. Our approach performs a systematic summation of locally perturbed states in order to obtain excited eigenstates localized in momentum space, using the corner transfer matrix method, and generalizes the framework to arbitrary unit cell sizes, the implementation of global Abelian symmetries and fermionic systems. Results for several test cases are presented, including the transverse Ising model, the spin-$1/2$ Heisenberg model, and a free fermionic model, to demonstrate the capability of the method to accurately capture dispersions. We also provide insight into the nature of excitations at the $k=(\ensuremath{\pi},0)$ point of the Heisenberg model.

Topics & Concepts

PhysicsAnsatzTransfer matrixQuasiparticleQuantum mechanicsIsing modelEigenvalues and eigenvectorsTensor (intrinsic definition)Excited stateSpin (aerodynamics)Heisenberg modelRealization (probability)Matrix (chemical analysis)Mathematical physicsMathematicsGeometryFerromagnetismComputer visionStatisticsThermodynamicsComputer scienceSuperconductivityComposite materialMaterials scienceQuantum many-body systemsPhysics of Superconductivity and MagnetismQuantum and electron transport phenomena
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