A non-monotone conservation law for dune morphodynamics

Note that we do not give the proof of Theorem 2 since it follows from the proof of Theorem 1 exactly as in the case of the semilinear heat equation 6 treated in [9].. We give

If W is a non-affine irreducible finitely generated Coxeter group, then W embeds as a discrete, C-Zariski dense subgroup of a complex simple Lie group with trivial centre, namely

Mumford proves that the intermediate Jacobian of X is isomorphic, as polarized abelian variety, to a so-called Prym variety.. This last part of Mumford’s proof is

More precisely, the application of the proposed method is investigated for solving the Sylvester matrix equation S (X) = C, where S is the well-known Sylvester operator S (X ) = AX

In this note, we prove that the density of the free additive convolution of two Borel probability measures supported on R whose Cauchy transforms behave well at innity can be

By weak monotone calculus we mean the fragment of Gentzen free of cuts between descendants of any structural rules..?. Weak

The second section deals with the presentation of the mathematical model that we consider, which is a specific case of hyperbolic model for chemotaxis where the velocity of the

These properties hold for weak solutions of quasilinear inequalities of p-Laplacian type, as well as for viscosity supersolutions of fully nonlinear equations of Isaacs type..