 Convergence of functionals and its applications to parabolic equationsGoro Akagi Abstract and Applied Analysis, 2004, vol. 2004, 1-27 Abstract: Asymptotic behavior of solutions of some parabolic equation associated with the p -Laplacian as p → + ∞ is studied for the periodic problem as well as the initial-boundary value problem by pointing out the variational structure of the p -Laplacian, that is, ∂ φ p ( u ) = − Δ p u , where φ p : L 2 ( Ω ) → [ 0 , + ∞ ] . To this end, the notion of Mosco convergence is employed and it is proved that φ p converges to the indicator function over some closed convex set on L 2 ( Ω ) in the sense of Mosco as p → + ∞ ; moreover, an abstract theory relative to Mosco convergence and evolution equations governed by time-dependent subdifferentials is developed until the periodic problem falls within its scope. Further application of this approach to the limiting problem of porous-medium-type equations, such as u t = Δ | u | m − 2 u as m → + ∞ , is also given. Date: 2004 Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:hin:jnlaaa:816814 DOI: 10.1155/S1085337504403030 Access Statistics for this article More articles in Abstract and Applied Analysis from Hindawi |
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