Entanglement entropy and infinite randomness fixed points in disordered magnetic and non-abelian quasi-particle chains
APA
Refael, G. (2010). Entanglement entropy and infinite randomness fixed points in disordered magnetic and non-abelian quasi-particle chains. Perimeter Institute. https://pirsa.org/10050071
MLA
Refael, Gil. Entanglement entropy and infinite randomness fixed points in disordered magnetic and non-abelian quasi-particle chains. Perimeter Institute, May. 26, 2010, https://pirsa.org/10050071
BibTex
@misc{ pirsa_PIRSA:10050071, doi = {10.48660/10050071}, url = {https://pirsa.org/10050071}, author = {Refael, Gil}, keywords = {}, language = {en}, title = {Entanglement entropy and infinite randomness fixed points in disordered magnetic and non-abelian quasi-particle chains}, publisher = {Perimeter Institute}, year = {2010}, month = {may}, note = {PIRSA:10050071 see, \url{https://pirsa.org}} }
California Institute of Technology (Caltech) - Physics Office
Collection
Talk Type
Abstract
Many one dimensional random quantum systems exhibit infinite randomness phases, such as the random singlet phase of the spin-1/2 Heisenberg model. These phases are typically the result of destabilizing systems described by a conformal field theory with disorder. Interestingly, entanglement entropy in 1d infinite randomness phases also exhibits a universal log scaling with length. In my talk I will touch upon calculating the entanglement entropy for inifinite-randomness phases, as well as describe the exotic infinite randomness phases realized in chains of non-abelian anyon chains. It was speculated that the entanglement entropy of an infinite-randomness phase is associated with the direction of RG flow, just as the c-theorem dictates the direction of RG flows for CFT's. I will also show that the entanglement entropy in disordered non-abelian chains provide the only known counter example.