Variational Approach for Many-Body Systems at Finite Temperature
Tao Shi, Eugene Demler, J. I. Cirac
Abstract
We introduce an equation for density matrices that ensures a monotonic decrease of the free energy and reaches a fixed point at the Gibbs thermal. We build a variational approach for many-body systems that can be applied to a broad class of states, including all bosonic and fermionic Gaussian, as well as their generalizations obtained by unitary transformations, such as polaron transformations in electron-phonon systems. We apply it to the Holstein model on 20×20 and 50×50 square lattices, and predict phase separation between the superconducting and charge-density wave phases in the strong interaction regime.
Topics & Concepts
PolaronUnitary statePhysicsGaussianSuperconductivityMonotonic functionClass (philosophy)Statistical physicsPhononQuantum mechanicsElectronMathematicsMathematical analysisComputer scienceArtificial intelligenceLawPolitical scienceQuantum many-body systemsPhysics of Superconductivity and MagnetismQuantum and electron transport phenomena