Litcius/Paper detail

Topology of critical points in boundary matrix duals

Pavan Kumar Yerra, Chandrasekhar Bhamidipati, Sudipta Mukherji

2024Journal of High Energy Physics31 citationsDOIOpen Access PDF

Abstract

A bstract Computation of topological charges of the Schwarzschild and charged black holes in AdS in canonical and grand canonical ensembles allows for a classification of the phase transition points via the Bragg-Williams off-shell free energy. We attempt a topological classification of the critical points and the equilibrium phases of the dual gauge theory via a phenomenological matrix model, which captures the features of the $$\mathcal{N}$$ = 4, SU( N ) Super Yang-Mills theory on S 3 at finite temperature at large N . With minimal modification of parameters, critical points of the matrix model at finite chemical potential can be classified as well. The topological charges of locally stable and unstable dynamical phases of the system turn out to be opposite to each other, totalling to zero, and this matches the analysis in the bulk.

Topics & Concepts

PhysicsDual polyhedronBoundary (topology)Topology (electrical circuits)Matrix (chemical analysis)Matrix modelTheoretical physicsMathematical physicsPure mathematicsCombinatoricsMathematical analysisString (physics)Composite materialMaterials scienceMathematicsBlack Holes and Theoretical PhysicsNoncommutative and Quantum Gravity TheoriesAdvanced Operator Algebra Research
Topology of critical points in boundary matrix duals | Litcius