Elliptic-Parabolic Equations with Hysteresis Boundary Conditions

Hornung, Ulrich; Showalter, R. E.

Citeable URL: https://ir.library.oregonstate.edu/concern/articles/x346d485k

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Attribute Name	Values
Creator	Hornung, Ulrich Showalter, R. E.
Abstract	A general porous-medium equation is uniquely solved subject to a pair of boundary conditions for the trace of the solution and a second function on the boundary. The use of maximal monotone graphs for the three nonlinearities permits not only the inclusion of the usual boundary conditions of Dirichlet, Neumann, or Robin type, including variational inequality constraints of Signorini type, but also dynamic boundary conditions and those that model hysteresis phenomena. It is shown that the dynamic is determined by a contraction semigroup in a product of L¹ spaces. Several examples and numerical results are described. Keywords: existence, hysteresis, semigroup, uniqueness, porous-media equation, nonlinear boundary condition Keywords: existence, hysteresis, semigroup, uniqueness, porous-media equation, nonlinear boundary condition
Resource Type	Article
DOI	https://doi.org/10.1137/S0036141093228290
Date Available	2014-11-05T19:37:52+00:00
Date Issued	1995-07
Citation	Hornung, U., & Showalter, R. E. (1995). Elliptic-parabolic equations with hysteresis boundary conditions. SIAM Journal on Mathematical Analysis, 26(4), 775-790. doi:10.1137/S0036141093228290
Journal Title	SIAM Journal on Mathematical Analysis
Journal Volume	26
Journal Issue/Number	4
Academic Affiliation	Mathematics
Rights Statement	Copyright Not Evaluated
Funding Statement (additional comments about funding)	The research of this author was supported by a grant from the NationalScience Foundation.
Publisher	Society for Industrial and Applied Mathematics
Peer Reviewed	Yes
Language	English [eng]
Replaces	http://hdl.handle.net/1957/53679

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Elliptic-Parabolic Equations with Hysteresis Boundary Conditions

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Elliptic-Parabolic Equations with Hysteresis Boundary Conditions

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