Dresden 2017 – scientific programme

Parts | Days | Selection | Search | Updates | Downloads | Help

DY: Fachverband Dynamik und Statistische Physik

DY 11: Critical phenomena

DY 11.8: Talk

Monday, March 20, 2017, 17:30–17:45, HÜL 186

Scaling theory of the Anderson transition in random graphs: ergodicity and universality — •Remy Dubertrand¹, Ignacio Garcia-Mata², Olivier Giraud³, Bertrand Georgeot⁴, John Martin¹, and Gabriel Lemarie⁴ — ¹IPNAS CESAM Université de Liège, Liège, Belgium — ²IFIMAR CONICET-UNMdP, Mar del Plata, Argentina — ³LPTMS CNRS Université Paris-Sud, Orsay, France — ⁴LPT IRSAMC Université de Toulouse CNRS, Toulouse, France

We study the Anderson transition on a generic model of random graphs with a tunable branching parameter 1< K≤ 2, through large scale numerical simulations and finite-size scaling analysis. This problem has attracted a renewed attractivity and is currently hotly debated [1,2,3].

We find that a single transition separates a localized phase from an unusual delocalized phase which is ergodic at large scales but strongly non-ergodic at smaller scales. The critical scalings and exponents are independent of the branching parameter, which strongly supports the universality of our results. During the talk I will describe the results presented in [4] and stress the unusual features of the Anderson transition we find on these random graphs.

[1] B. Altshuler et al., arXiv:1605.02295 (2016)

[2] K. Tikhonov et al., arXiv:1604.05353 (2016)

[3] D. Facoetti et al., arXiv:1607.05942 (2016)

[4] I. Garcia-Mata et al., arXiv:1609.05857 (2016)