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Time dependent variational principle for tree Tensor Networks

Daniel Bauernfeind, Markus Aichhorn

2020SciPost Physics63 citationsDOIOpen Access PDF

Abstract

We present a generalization of the Time Dependent Variational Principle (TDVP) to any finite sized loop-free tensor network. The major advantage of TDVP is that it can be employed as long as a representation of the Hamiltonian in the same tensor network structure that encodes the state is available. Often, such a representation can be found also for long-range terms in the Hamiltonian. As an application we use TDVP for the Fork Tensor Product States tensor network for multi-orbital Anderson impurity models. We demonstrate that TDVP allows to account for off-diagonal hybridizations in the bath which are relevant when spin-orbit coupling effects are important, or when distortions of the crystal lattice are present.

Topics & Concepts

MathematicsTensor productTensor (intrinsic definition)Tensor product of Hilbert spacesRepresentation (politics)Tensor contractionHamiltonian (control theory)GeneralizationVariational principleTensor densityLattice (music)Cartesian tensorCoupling (piping)Topology (electrical circuits)Statistical physicsPhysicsState (computer science)Mathematical analysisPure mathematicsProduct (mathematics)Quantum many-body systemsTopological Materials and PhenomenaMachine Learning in Materials Science