REGULARITY AND TIME ASYMPTOTIC BEHAVIOUR OF SOLUTIONS TO TRANSPORT EQUATIONS

The aim of this paper is to investigate the behaviour as tP R of solutions to the Cauchy problem , where '0 is a fixed constant, t\*0, x31L. First, we prove that if u is the solution to the linearized equation, i.e. with • F(u),0, then u decays like a solution for the analogous problem to the heat

## Abstract We study the asymptotic regularity of solutions to Hartree–Fock (HF) equations for Coulomb systems. To deal with singular Coulomb potentials, Fock operators are discussed within the calculus of pseudo‐differential operators on conical manifolds. First, the non‐self‐consistent‐field case

In this paper we consider the regularity of solutions to nomlinear Schrödinger equations (NLS), \[ \begin{aligned} i \hat{C}, u+\frac{1}{3} \| u & =F(u, u) . & & (t, x) \in \mathbb{R} \times \mathbb{B}^{\prime \prime}, \\ u(0) & =\phi . & & x \in \mathbb{R}^{u} . \end{aligned} \] where \(F\) is a po

## Abstract The goal of this paper is to analyse some spectral properties of time‐dependent monoenergetic linear transport equation with perfect reflecting boundary conditions.It is proved that the streaming operator generates a strongly continuous group and its explicit expression is derived. This