Non-linear wave equations in domains with variable boundary

## Abstract We present a global existence theorem for solutions of __u__^__tt__^ − ∂~__i__~__a__~__ik__~ (__x__)∂~__k__~__u__ + u~t~ = ƒ(__t__, __x__, __u__, __u__~__t__~, ∇__u__, ∇__u__~__t__~, ∇^2^__u__), __u__(__t__ = 0) = __u__^0^, __u__(=0)=__u__^1^, __u__(__t, x__), __t__ ⪖ 0, __x__ϵΩ.Ω equal

We study in this paper the global existence and exponential decay of solutions of the non-linear unidimensional wave equation with a viscoelastic boundary condition. We prove that the dissipation induced by the memory e!ect is strong enough to secure global estimates, which allow us to show existenc

## Abstract In this article, we present results concerning with the existence of global solutions and a rate decay estimate for energy associated with an initial and boundary value problem for a beam evolution equation with variable coefficients in non‐cylindrical domains. Copyright © 2007 John Wil