Enrique Cortés will defend his doctoral thesis on Wednesday, December 19th

Enrique Cortes
  • The defense will take place in the Faculty of Science and Technology of the University of the Basque Country, located in the Campus of Leioa

Enrique Cortés joined the Basque Center for Applied Mathematics in September 2014 as a PhD student. Previously, he had obtained a Bachelor (2012) and a Master degree (2013) in Mathematics from Universidad Complutense de Madrid.

His PhD thesis has been directed by Miguel Escobedo Martínez (UPV-EHU) and by Ikerbasque Research Professor Jean-Bernard Bru, leader of the Quantum Mechanics group at BCAM.

On behalf of all BCAM members, we would like to wish Enrique the best of luck on his thesis defense.

Title: Measure-valued weak solutions for some kinetic equations with singular kernels for quantum particles

In this thesis, we present a mathematical study of three problems arising in the kinetic theory of quantum gases.

In the first part, we consider a Boltzmann equation that is used to describe the time evolution of the particle density of a homogeneous and isotropic photon gas, that interacts through Compton scattering with a low-density electron gas at non-relativistic equilibrium.

The kernel in the kinetic equation is highly singular, and we introduce a truncation motivated by the very-peaked shape of the kernel along the diagonal. With this modified kernel, the global existence of measure-valued weak solutions is established for a large set of initial data.

We also study a simplified version of this equation, that appears at very low temperatures of the electron gas, where only the quadratic terms are kept. The global existence of measure-valued weak solutions is proved for a large set of initial data, as well as the global existence of $L^1$ solutions for initial data that satisfy a strong integrability condition near the origin. The long time asymptotic behavior of weak solutions for this simplified equation is also described.

In the second part of the thesis, we consider a system of two coupled kinetic equations related to a simplified model for the time evolution of the particle density of the normal and superfluid components in a homogeneous and isotropic weakly interacting dilute Bose gas.

We establish the global existence of measure-valued weak solutions for a large class of initial data. The conservation of mass and energy and the production of moments of all positive order is also proved. Finally, we study some of the properties of the condensate density and establish an integral equation that describes its time evolution.