Relaxation Limit from the Quantum Navier–Stokes Equations to the Quantum Drift–Diffusion Equation
Paolo Antonelli, Giada Cianfarani Carnevale, Corrado Lattanzio, Stefano Spirito
Abstract
Abstract The relaxation time limit from the quantum Navier–Stokes–Poisson system to the quantum drift–diffusion equation is performed in the framework of finite energy weak solutions. No assumptions on the limiting solution are made. The proof exploits the suitably scaled a priori bounds inferred by the energy and BD entropy estimates. Moreover, it is shown how from those estimates the Fisher entropy and free energy estimates associated to the diffusive evolution are recovered in the limit. As a byproduct, our main result also provides an alternative proof for the existence of finite energy weak solutions to the quantum drift–diffusion equation.
Topics & Concepts
QuantumMathematicsStatistical physicsLimit (mathematics)Relaxation (psychology)Poisson's equationEntropy (arrow of time)DiffusionMathematical analysisPhysicsQuantum mechanicsPsychologySocial psychologyAdvanced Thermodynamics and Statistical MechanicsGas Dynamics and Kinetic TheoryMathematical Biology Tumor Growth