Integrable modification of the critical Chalker-Coddington network model

Physical Review B American Physical Society (APS) 84:14 (2011) 144201

Authors:

Yacine Ikhlef, Paul Fendley, John Cardy

Abstract:

We consider the Chalker-Coddington network model for the integer quantum Hall effect, and examine the possibility of solving it exactly. In the supersymmetric path integral framework, we introduce a truncation procedure, leading to a series of well-defined two-dimensional loop models with two loop flavors. In the phase diagram of the first-order truncated model, we identify four integrable branches related to the dilute Birman-Wenzl-Murakami braid-monoid algebra and parameterized by the loop fugacity n. In the continuum limit, two of these branches (1,2) are described by a pair of decoupled copies of a Coulomb-gas theory, whereas the other two branches (3,4) couple the two loop flavors, and relate to an SU(2)r×SU(2)r/SU(2)2r Wess-Zumino-Witten (WZW) coset model for the particular values n=−2cos[π/(r+2)], where r is a positive integer. The truncated Chalker-Coddington model is the n=0 point of branch 4. By numerical diagonalization, we find that its universality class is neither an analytic continuation of the WZW coset nor the universality class of the original Chalker-Coddington model. It constitutes rather an integrable, critical approximation to the latter.

Topological phase transition in a network model with preferential attachment and node removal

EUROPEAN PHYSICAL JOURNAL B 83:4 (2011) 519-524

Authors:

H Bauke, C Moore, JB Rouquier, D Sherrington

Abstract:

Preferential attachment is a popular model of growing networks. We consider a generalized model with random node removal, and a combination of preferential and random attachment. Using a high-degree expansion of the master equation, we identify a topological phase transition depending on the rate of node removal and the relative strength of preferential vs. random attachment, where the degree distribution goes from a power law to one with an exponential tail.

Charge Transport in Weyl Semimetals

(2011)

Authors:

Pavan Hosur, SA Parameswaran, Ashvin Vishwanath

The eight-vertex model and lattice supersymmetry

(2011)

Authors:

Christian Hagendorf, Paul Fendley

Condensation of achiral simple currents in topological lattice models: Hamiltonian study of topological symmetry breaking

Physical Review B - Condensed Matter and Materials Physics 84:12 (2011)

Authors:

FJ Burnell, SH Simon, JK Slingerland

Abstract:

We describe a family of phase transitions connecting phases of differing nontrivial topological order by explicitly constructing Hamiltonians of the Levin-Wen type which can be tuned between two solvable points, each of which realizes a different topologically ordered phase. We show that the low-energy degrees of freedom near the phase transition can be mapped onto those of a Potts model, and we discuss the stability of the resulting phase diagram to small perturbations about the model. We further explain how the excitations in the condensed phase are formed from those in the original topological theory, some of which are split into multiple components by condensation, and we discuss the implications of our results for understanding the nature of general achiral topological phases in 2 + 1 dimensions in terms of doubled Chern-Simons theories. © 2011 American Physical Society.