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Geometric properties of the solutions of a Hele-Shaw type equation

Author(s): Konstantin Kornev; Alexander Vasil'ev
Journal: Proc. Amer. Math. Soc. 128 (2000), 2683-2685.
MSC (1991): Primary 35Q35; Secondary 30C45
Posted: February 25, 2000
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Abstract: This article deals with the application of the methods of geometric function theory to the investigation of the free boundary problem for the equation describing flows in an unbounded simply-connected plane domain. We prove the invariance of some geometric properties of a moving boundary.

References:

[1]
C.M.Elliot, J.R.Ockendon, Weak and variational methods for moving boundary problem, Pitman, London, 1992. MR 83i:35157

[2]
Yu.E.Hohlov, D.V.Prokhorov, A.Yu.Vasil'ev, On geometric properties of free boundaries in the Hele-Shaw flows moving boundary problem, Lobachevskii J. Math. 1 (1998), 3-13.

[3]
S.D.Howison, Complex variable methods in Hele-Shaw moving boundary problems, Europ. J. Appl. Math. 3 (3) (1992), 209-224. MR 94f:76025

[4]
S.D.Howison, Yu.E.Hohlov, On the classification of solutions to the zero-surface-tension model for Hele-Shaw free boundary flows, Quart. Appl. Math. 54 (4) (1994), 777-789. MR 94j:76070

[5]
M.Reissig, L. von Wolfersdorf, A simplified proof for a moving boundary problem for Hele-Shaw flows in the plane, Ark. Mat. 31 (1) (1993), 101-116. MR 94m:35250

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Additional Information:

Konstantin Kornev
Affiliation: Institute of Problems in Mechanics, Russian Academy of Sciences, Moscow, Russia
Email: kidin@ipm.msk.su

Alexander Vasil'ev
Affiliation: Departamento de Matemáticas, Universidad de los Andes, Bogotá, Colombia
Email: avassill@uniandes.edu.co

DOI: 10.1090/S0002-9939-00-05348-X
PII: S 0002-9939(00)05348-X
Keywords: Free boundary, Hele-Shaw equation, convex function in the positive direction
Received by editor(s): May 26, 1998
Received by editor(s) in revised form: October 27, 1998
Posted: February 25, 2000
Additional Notes: The authors were supported in part by the Russian Foundation for Basic Research, Grants \#98-01-00842, \#98-15-96002.
Communicated by: Albert Baernstein II
Copyright of article: Copyright 2000, American Mathematical Society

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