English

Semidual Kitaev lattice model and tensor network representation

Quantum Algebra 2021-09-29 v3 General Relativity and Quantum Cosmology High Energy Physics - Theory

Abstract

Kitaev's lattice models are usually defined as representations of the Drinfeld quantum double D(H)=HHopD(H)=H\bowtie H^{*\text{op}} , as an example of a double cross product quantum group. We propose a new version based instead on M(H)=Hcop ⁣ ⁣ ⁣HM(H)=H^{\text{cop}}\blacktriangleright\!\!\!\triangleleft H as an example of Majid's bicrossproduct quantum group, related by semidualisation or `quantum Born reciprocity' to D(H)D(H). Given a finite-dimensional Hopf algebra HH, we show that a quadrangulated oriented surface defines a representation of the bicrossproduct quantum group Hcop ⁣ ⁣ ⁣HH^{\text{cop}}\blacktriangleright\!\!\!\triangleleft H. Even though the bicrossproduct has a more complicated and entangled coproduct, the construction of this new model is relatively natural as it relies on the use of the covariant Hopf algebra actions. Working locally, we obtain an exactly solvable Hamiltonian for the model and provide a definition of the ground state in terms of a tensor network representation.

Keywords

Cite

@article{arxiv.1709.00522,
  title  = {Semidual Kitaev lattice model and tensor network representation},
  author = {Florian Girelli and Prince K. Osei and Abdulmajid Osumanu},
  journal= {arXiv preprint arXiv:1709.00522},
  year   = {2021}
}

Comments

34 pages

R2 v1 2026-06-22T21:31:07.788Z