Local and Global Existence of Multiple Waves Near Formal Approximations
Abstract
Assuming that a formal approximation of multiple waves has been obtained by matched asymptotic methods, we derive a Spatial Shadowing lemma to construct exact solutions near the formal approximation. In Part I, we consider a general singularly perturbed parabolic system. ε ut + (-ε2)m D2mx u = f(u,ε ux,·s,(ε Dx)2m-1 u,x,ε). We show that if the formal approximation is precise, there is always an exact solution nearby for at least a short time. Examples include Cahn-Hilliard equation and viscous profile of conservation laws. In Part II, we show under some more assumptions, the process in Part I can be repeated to obtain global solutions if the formal approximation is a global one. Examples include reaction-diffusion equations and phase field equations.
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