NADec 20, 2018
The Ostrovsky Hunter equation with a space dependent flux functionNeelabja Chatterjee, Nils Henrik Risebro
We study the periodic Ostrovsky-Hunter equation in the case where the flux function may depend on the spatial variable. Our main results are that if the flux function is twice differentiable, then there exists a unique entropy solution. This entropy solution may be constructed as a limit of approximate solutions generated by a finite volume scheme, and the finite volume approximations converge to the entropy solution at a rate 1/2.
NAApr 24, 2018
A convergent finite volume method for the Kuramoto equation and related non-local conservation lawsNeelabja Chatterjee, Ulrik Skre Fjordholm
We derive and study a Lax--Friedrichs type finite volume method for a large class of nonlocal continuity equations in multiple dimensions. We prove that the method converges weakly to the measure-valued solution, and converges strongly if the initial data is of bounded variation. Several numerical examples for the kinetic Kuramoto equation are provided, demonstrating that the method works well both for regular and singular data.