Quantum critical scaling and holographic bound for transport coefficients near Lifshitz points

• Published in: The journal of high energy physics Vol. 2020; no. 11; pp. 1 - 36
• Main Authors: Inkof, Gian Andrea, Küppers, Joachim M. C., Link, Julia M., Goutéraux, Blaise, Schmalian, Jörg
• Format: Journal Article
• Language: English
• Published: Berlin/Heidelberg Springer Berlin Heidelberg 01.11.2020; Springer; SpringerOpen
• Subjects: Classical and Quantum Gravitation; Elementary Particles; Gauge-gravity correspondence; General Physics; High Energy Physics - Theory; Holography and condensed matter physics (AdS/CMT); Physics; Physics and Astronomy; Quantum Field Theories; Quantum Field Theory; Quantum Physics; Regular Article - Theoretical Physics; Relativity Theory; String Theory; Gauge-gravity correspondence; Holography and condensed matter physics (AdS/CMT); transport theory; gravitation: duality; Einstein-Maxwell equation; conductivity: electric; viscosity; scaling: anisotropy; gravitation: dilaton; critical phenomena
• ISSN: 1029-8479; 1126-6708; 1029-8479
• DOI: 10.1007/JHEP11(2020)088

A bstract The transport behavior of strongly anisotropic systems is significantly richer compared to isotropic ones. The most dramatic spatial anisotropy at a critical point occurs at a Lifshitz transition, found in systems with merging Dirac or Weyl point or near the superconductor-insulator quantum phase transition. Previous work found that in these systems a famous conjecture on the existence of a lower bound for the ratio of a shear viscosity to entropy is violated, and proposed a generalization of this bound for anisotropic systems near charge neutrality involving the electric conductivities. The present study uses scaling arguments and the gauge-gravity duality to confirm the previous analysis of universal bounds in anisotropic Dirac systems. We investigate the strongly-coupled phase of quantum Lifshitz systems in a gravitational Einstein-Maxwell-dilaton model with a linear massless scalar which breaks translations in the boundary dual field theory and sources the anisotropy. The holographic computation demonstrates that some elements of the viscosity tensor can be related to the ratio of the electric conductivities through a simple geometric ratio of elements of the bulk metric evaluated at the horizon, and thus obey a generalized bound, while others violate it. From the IR critical geometry, we express the charge diffusion constants in terms of the square butterfly velocities. The proportionality factor turns out to be direction-independent, linear in the inverse temperature, and related to the critical exponents which parametrize the anisotropic scaling of the dual field theory.