Add to ORKGWe prove that symmetrizable hyperbolic systems have finite speed of propagation. This is done by constructing the solution by the method of finite differences. The estimate for the speed is not sharp. Proving a precise result is an open problem.
A degenerate parabolic partial differential equation with a time derivative and first- and second-or...
AbstractWe study the computability properties of symmetric hyperbolic systems of PDE's A∂u∂t+∑i=1mBi...
Summary Hyperbolic degeneration of the problems for wave guide type systems with respect to transver...
In this article we are interested in the propagation speed for solution of hyperbolic boundary value...
We prove that strongly continuous groups generated by first order systems on Riemannian manifolds h...
International audienceIn this note we investigate local properties for microlocally symmetrizable hy...
AbstractWe study symmetrization of hyperbolic first order systems. To be precise, generalizing non-d...
Recently a new theory of heat conduction has appeared in the literature. The raison d'etre of this t...
International audienceThis note deals with first order hyperbolic systems with constant mul-tiplicit...
International audienceThis article is dedicated to the long time behavior of a finite volume approxi...
We derive analytic solutions to the scalar and vector advection equation with variable coefficients ...
The asymptotic speed problem of front solutions to hyperbolic reaction-diffusion (HRD) equations is ...
Abstract. We prove the property of finite speed of propagation for degenerate parabolic equations o...
<p>The parabolic (Fisher-Kolmogorov) PDE gives wave speed that indefinitely grows with network degr...
The propagation of analyticity for sufficiently smooth solutions to either strictly hyperbolic, or s...
A degenerate parabolic partial differential equation with a time derivative and first- and second-or...
AbstractWe study the computability properties of symmetric hyperbolic systems of PDE's A∂u∂t+∑i=1mBi...
Summary Hyperbolic degeneration of the problems for wave guide type systems with respect to transver...
In this article we are interested in the propagation speed for solution of hyperbolic boundary value...
We prove that strongly continuous groups generated by first order systems on Riemannian manifolds h...
International audienceIn this note we investigate local properties for microlocally symmetrizable hy...
AbstractWe study symmetrization of hyperbolic first order systems. To be precise, generalizing non-d...
Recently a new theory of heat conduction has appeared in the literature. The raison d'etre of this t...
International audienceThis note deals with first order hyperbolic systems with constant mul-tiplicit...
International audienceThis article is dedicated to the long time behavior of a finite volume approxi...
We derive analytic solutions to the scalar and vector advection equation with variable coefficients ...
The asymptotic speed problem of front solutions to hyperbolic reaction-diffusion (HRD) equations is ...
Abstract. We prove the property of finite speed of propagation for degenerate parabolic equations o...
<p>The parabolic (Fisher-Kolmogorov) PDE gives wave speed that indefinitely grows with network degr...
The propagation of analyticity for sufficiently smooth solutions to either strictly hyperbolic, or s...
A degenerate parabolic partial differential equation with a time derivative and first- and second-or...
AbstractWe study the computability properties of symmetric hyperbolic systems of PDE's A∂u∂t+∑i=1mBi...
Summary Hyperbolic degeneration of the problems for wave guide type systems with respect to transver...