Open AccessThe Well-Posedness of the Kuramoto–Sivashinsky Equation
Author(s) -
Eitan Tadmor
Publication year - 1986
Publication title -
siam journal on mathematical analysis
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.882
H-Index - 92
eISSN - 1095-7154
pISSN - 0036-1410
DOI - 10.1137/0517063
Subject(s) - mathematics , mathematical analysis , quadratic equation , nonlinear system , burgers' equation , parabolic partial differential equation , partial differential equation , stability (learning theory) , geometry , physics , quantum mechanics , machine learning , computer science
The Kuramoto–Sivashinsky equation arises in a variety of applications, among which are modeling reaction-diffusion systems, flame-propagation and viscous flow problems. It is considered here, as a prototype to the larger class of generalized Burgers equations: those consist of quadratic nonlinearity and arbitrary linear parabolic part. We show that such equations are well-posed, thus admitting a unique smooth solution, continuously dependent on its initial data. As an attractive alternative to standard energy methods, existence and stability are derived in this case, by “patching” in the large short time solutions without “loss of derivatives”.
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