Critical properties of homogeneous binary trees
arXiv:0912.0466 · doi:10.1103/PhysRevA.81.062335
Abstract
Many-body states whose wave-function admits a representation in terms of a uniform binary-tree tensor decomposition are shown to obey to power-law two-body correlations functions. Any such state can be associated with the ground state of a translational invariant Hamiltonian which, depending on the dimension of the systems sites, involve at most couplings between third-neighboring sites. A detailed analysis of their spectra shows that they admit an exponentially large ground space.
6 pages, 2 figures