Collective dynamics of Fermi-surface fluctuations in an interacting Weyl metal phase

TL;DR

This paper extends Landau's Fermi-liquid theory to include Berry curvature and chiral anomaly effects in Weyl metals, analyzing collective Fermi-surface fluctuations and their instabilities, revealing new stability criteria and phase diagrams.

Contribution

It introduces a generalized stability analysis of Fermi-liquid states in Weyl metals incorporating topological effects, and explores the impact on zero-sound modes and phase separation.

Findings

Berry curvature alters Fermi-liquid instability criteria.

Zero-sound mode stability is affected by topological effects.

Proposes a phase diagram for topological Fermi-liquid stability.

Abstract

Introducing both the Berry curvature and chiral anomaly into the Landau's Fermi-liquid theory, we investigate collective dynamics of Fermi-surface fluctuations and reveal their instabilities in an interacting Weyl metal phase with broken time reversal symmetry. Based on the Boltzmann-equation framework, we find criteria for the stability of the topological Fermi-liquid state as a function of forward scattering Landau's interaction parameters and the distance of a pair of Weyl points given by an external magnetic field. In addition to these instability criteria for general angular momentum channels, we investigate the dispersion relation of the zero-sound mode as the simplest example of such Fermi-surface fluctuations. Zero sound modes are well-defined collective excitations in a Landau's Fermi-liquid state, given by the collective dynamics of Fermi-surface deformations in the spin-singlet channel with zero angular momentum, where their instability is related with phase separation. We find that the role of the Berry curvature changes the instability criteria of the Landau's Fermi-liquid state. Even if the zero-sound mode is stable in the region of the forward-scattering amplitude, the Berry curvature gives rise to Landau damping beyond the Landau's Fermi-liquid theory. Based on the instability criterion of the zero-sound mode, we propose a phase diagram for a topological Fermi-liquid state against the phase separation in the plane of Landau's interaction parameter and effective Berry curvature, which generalizes the one-dimensional phase diagram of the Landau's Fermi-liquid theory.