Quasilinear hyperbolic–hyperbolic singular perturbations with nonmonotone nonlinearity

## Communicated by W. Eckhaus We present the asymptotic analysis of a quasilinear hyperbolic-hyperbolic singular perturbation problem in one dimension. The leading part of the analysis concerns the constrqction of some shock layers associated with discontinuities of a hyperbolic problem. This stud

## Abstract We consider a hyperbolic–parabolic singular perturbation problem for a quasilinear hyperbolic equation of Kirchhoff type with dissipation weak in time. The purpose of this paper is to give time‐decay convergence estimates of the difference between the solutions of the hyperbolic equatio

Plasticity, ferromagnetism, ferroelectricity and other phenomena lead to quasilinear hyperbolic equations of the form where F is a (possibly discontinuous) hysteresis operator, and A is a second order elliptic operator. Existence of a solution is proved for an associated initial-and boundary-value

## Abstract This paper is concerned with the effect of perturbing Burgers' equation by a small term ϵ^2^ __U__~__tt__~. It is shown by means of an energy estimate that the solution of Burgers' equation provides a uniform __O__ (ϵ) approximation of the solution of the full hyperbolic problem. Existe

## Communicated by By T. Li The mechanism of singularity formation is discussed for a kind of blocked quasilinear hyperbolic system with linearly degenerate characteristics, so that the ODE singularity can be shown for some kinds of complete reducible systems and, in particular, all the results in