On the nonlinear Dirac equation on noncompact metric graphs
Texte intégral
Figure
Documents relatifs
We study a simple stochastic differential equation (SDE) driven by one Brownian motion on a general oriented metric graph whose solutions are stochastic flows of kernels.. Under
An earlier paper [1] used SEA and a simple power balance approach to develop expressions for a first-order flanking path in terms of the resonant sound reduction index of the
La conception pour l’environnement s’inscrit dans une démarche qui prend en considération tous les aspects de l'environnement dans chaque étape du processus du développement d’un
As mentioned in 4.2, our algorithm solves an inverse problem: given a sequence of histograms representing a movement of mass, we aim at fitting a metric for which that sequence can
We study a simple stochastic differential equation (SDE) driven by one Brownian motion on a general oriented metric graph whose solu- tions are stochastic flows of kernels.. Under
[11] A. Grünrock, Bi- and trilinear Schrödinger estimates in one space dimension with applications to cubic NLS and DNLS, International Mathematics Research Notices, 41 ,
We prove the global well-posedness and we study the linear response for a system of two coupled equations composed of a Dirac equation for an infinite rank operator and a nonlinear
Finally, we obtain an exponential rate of convergence towards equilibrium if the initial data is controlled by Fermi-Dirac distributions and the convergence to zero of the