Litcius/Paper detail

Valley magnetism, nematicity, and density wave orders in twisted bilayer graphene

Dmitry V. Chichinadze, Laura Classen, Andrey V. Chubukov

2020Physical review. B./Physical review. B55 citationsDOIOpen Access PDF

Abstract

We analyze density wave and Pomeranchuk orders in twisted bilayer graphene. This complements our earlier analysis of the pairing instabilities. We assume that near half filling of either conduction or valence band, the Fermi level is close to Van Hove points, where the density of states diverges, and study potential instabilities in the particle-hole channel within a patch model with two valley degrees of freedom. The hexagonal symmetry of twisted bilayer graphene allows for either six or twelve Van Hove points. We consider both cases and find the same two leading candidates for particle-hole order. One is an SU(2)-breaking spin state with ferromagnetism within a valley. A subleading intervalley hopping induces antiferromagnetism between the valleys. The same state has also been obtained in strong-coupling approaches, indicating that this order is robust. The other is a mixed state with ${120}^{\ensuremath{\circ}}$ complex spin order and orthogonal complex charge order. In addition, we find a weaker but still attractive interaction in nematic channels, and discuss the type of a nematic order.

Topics & Concepts

Condensed matter physicsBilayer graphenePhysicsAntiferromagnetismMagnetismDensity of statesDensity wave theoryDegrees of freedom (physics and chemistry)GrapheneQuantum mechanicsGraphene research and applicationsQuantum and electron transport phenomenaQuantum Electrodynamics and Casimir Effect