Chiral anomalous magnetohydrodynamics in action: effective field theory and holography

Chiral anomalous magnetohydrodynamics in action: effective field theory and holography

Abstract Chiral Anomalous Magnetohydrodynamics (CAMHD) provides a low-energy effective framework for describing chiral fluids in the presence of dynamical electromagnetic fields and axial anomaly. This theory finds applications across diverse physical systems, including heavy-ion collisions, the ear...

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Bibliographic Details
Main Authors: Matteo Baggioli, Yanyan Bu, Xiyang Sun
Format: Article
Language:English
Published: SpringerOpen 2025-04-01
Series:Journal of High Energy Physics
Subjects:
AdS-CFT Correspondence
Field Theory Hydrodynamics
Gauge-Gravity Correspondence
Holography and Hydrodynamics
Online Access:https://doi.org/10.1007/JHEP04(2025)126
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Summary:Abstract Chiral Anomalous Magnetohydrodynamics (CAMHD) provides a low-energy effective framework for describing chiral fluids in the presence of dynamical electromagnetic fields and axial anomaly. This theory finds applications across diverse physical systems, including heavy-ion collisions, the early universe, and Weyl/Dirac semimetals. Along with Schwinger-Keldysh (SK) effective theories, holographic models serve as a complementary tool to provide a systematic formulation of CAMHD that goes beyond the weak coupling regime. In this work, we explore holographic models with U(1) A × U(1) symmetry, where the electromagnetic U(1) field is rendered dynamical through mixed boundary conditions applied to the bulk gauge field and the axial anomaly is introduced via a Chern-Simons bulk term. Through a detailed holographic SK analysis, we demonstrate that the low-energy effective action derived from this model aligns precisely with the SK field theory proposed by Landry and Liu and, in fact, it generalizes it to scenarios with finite background axial field. This alignment not only validates the holographic model but also paves the way for its use in exploring unresolved aspects of CAMHD, such as the recently proposed chiral magnetic electric separation wave and nonlinear chiral instabilities.
ISSN:1029-8479

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