Selfsimilar solutions in a sector for a quasilinear parabolic equation

A. Friedman; B. Lou; D. A. V. Stow; D. Hilhorst; G. Dong; G. M. Lieberman; H. Matano; H.-H. Chern; J. B. Keller; J.-S. Guo; J.-S. Guo; K. H. W. J. Ten Tusscher; M.-H. Giga; O. A. Ladyzhenskia; P. Brunovský; X. Chen; Y. Kohsaka; Y.-L. Chang

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Selfsimilar solutions in a sector for a quasilinear parabolic equation

Authors: A. Friedman
B. Lou
D. A. V. Stow
D. Hilhorst
G. Dong
G. M. Lieberman
H. Matano
H.-H. Chern
J. B. Keller
J.-S. Guo
J.-S. Guo
K. H. W. J. Ten Tusscher
M.-H. Giga
O. A. Ladyzhenskia
P. Brunovský
X. Chen
Y. Kohsaka
Y.-L. Chang
Publication date: 1 January 2012
Publisher: 'American Institute of Mathematical Sciences (AIMS)'
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Abstract

We study a two-point free boundary problem in a sector for a quasilinear parabolic equation. The boundary conditions are assumed to be spatially and temporally "self-similar" in a special way. We prove the existence, uniqueness and asymptotic stability of an expanding solution which is self-similar at discrete times. We also study the existence and uniqueness of a shrinking solution which is self-similar at discrete times.Comment: 23 page

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info:doi/10.3934%2Fnhm.2012.7....

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