Exact controllability of scalar conservation laws with strict convex flux

Bouriah and M.Darwish, Nonlinear Boundary Value Problem for Implicit Differential Equations of Fractional Order in Banach Spaces, Fixed Point Theory (to appear).. Bouriah, Existence

Zuazua study the long time behaviour of a homogeneous version of (1); we also refer the interested reader to [11], in which M. Zuazua extend the analysis performed in [12] to the

The Godunov scheme for scalar conservation laws with discontinuous bell-shaped flux functions.. Boris Andreianov,

inhomogeneous scalar conservation law; discontinuous flux; change of variables; entropy solution; vanishing viscosity approximation; well-posedness; crossing

We show that the Cauchy Problem for a randomly forced, periodic multi-dimensional scalar first-order conservation law with additive or multiplicative noise is well-posed: it admits

Concerning the exact controllability for the scalar convex conservation laws the first work has been done in [ 13 ], where they considered the initial boundary value problem in

1 Let us observe in passing that in [47,49] the authors established existence and uniqueness of entropy solutions with a combination of u- and x-discontinuities; this approach is

However with an additional control g(t) as in (1.1) and with f (z) = z 2 2 (Burgers equation), Chapouly showed in [9] that in the framework of classical solutions, any state