Scattering for a Quasilinear Hyperbolic Equation of Kirchhoff Type

## 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

We investigate the evolution problem u#m("Au")Au"0, u( where H is a Hilbert space, A is a self-adjoint linear non-negative operator on H with domain D(A), and We prove that if u 3D(A), and m("Au ")O0, then there exists at least one global solution, which is unique if either m never vanishes, or m

We establish here the convergence (thereby proving the existence) of a semi-discrete scheme for the quasilinear hyperbolic equation u(0, .) = 4 where x E R", t E [O,T], and d E L"(R"). It is well known that the above problem does not necessarily have global classical solutions and the usual concept

## Abstract Given self‐adjoint operators __H__~j~, on Hilbert spaces ℋ︁~j~, __j__ = 0,l, and __J__ ∈ ℬ︁ (ℋ︁~0~, ℋ︁~1~) (where ℬ︁ (ℋ︁~0~ ℋ︁~1~) denotes the set of bounded linear operators from ℋ︁~0~to ℋ︁~1~), define the wave operators magnified image where __P__~0~ is the projection onto the subspac