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A Property of Weak Solutions for Some Parabolic Equations of Higher Order
Published online by Cambridge University Press: 22 January 2016
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Recently Aronson [1] proved the uniqueness property of weak solutions of the initial boundary value problem for second order parabolic equations with discontinuous coefficients. An analogous result to Aronson’s was proved by Kuroda M in the case of some parabolic equations of higher order, where the method due to Aronson [2] plays an essential role. In this paper, under the same idea we shall be concerned with the asymptotic behavior of weak solutions for parabolic equations of higher order of the divergence form, when the data are prescribed on a portion of a time-like surface.
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- Copyright © Editorial Board of Nagoya Mathematical Journal 1967
References
[1]
Aronson, D. G., On the Green’s function for second order parabolic differential equations with discontinuous coefficients. Bulletin of the American Mathematical Society
69. (1963), pp. 841–847.CrossRefGoogle Scholar
[2]
Aronson, D. G., Uniqueness of positive weak solutions of second order parabolic equations. Annales Polonici Mathematici
XVI (1965), pp. 285–303.Google Scholar
[3]
Chen, L. S., Asymptotic behavior of solutions of parabolic equations of higher order. (to appear in Pacific J. Math.).Google Scholar
[4]
Kuroda, T., Note on the uniqueness property of weak solutions of parabolic equations. (to appear in Nagoya Math. J.).Google Scholar
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