Weighted Poincaré and Korn inequalities for Hölder <i>α</i> domains

Gabriel Acosta, Ricardo G. Durán, Ariel L. Lombardi

Type: Article

Publication Date: 2005-10-17

Citations: 24

DOI: https://doi.org/10.1002/mma.680

Abstract

Abstract It is known that the classic Korn inequality is not valid for Hölder α domains. In this paper, we prove a family of weaker inequalities for this kind of domains, replacing the standard L p ‐norms by weighted norms where the weights are powers of the distance to the boundary. In order to obtain these results we prove first some weighted Poincaré inequalities and then, generalizing an argument of Kondratiev and Oleinik, we show that weighted Korn inequalities can be derived from them. The Poincaré type inequalities proved here improve previously known results. We show by means of examples that our results are optimal. Copyright © 2005 John Wiley & Sons, Ltd.

Locations

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Works Cited by This (14)

Action	Title	Year	Authors
+ PDF Chat	On Korn's second inequality	1981	J. A. Nitsche
+	Elliptic Problems in Nonsmooth Domains	2011	Pierre Grisvard
+	Partial Differential Equations	2010	Lawrence Evans
+	New Poincaré inequalities from old.	1998	Stephen M. Buckley Pekka Koskela
+ PDF Chat	Integral inequalities of Hardy and Poincaré type	1988	Harold P. Boas Emil J. Straube
+ PDF Chat	On certain inequalities and characteristic value problems for analytic functions and for functions of two variables	1937	K. O. Friedrichs
+	On Korn's inequality	1961	L. E. Payne Hans F. Weinberger
+	On Hardy—Type Inequalities	1998	D. E. Edmunds Ritva Hurri-Syrjänen
+	The Korn inequality for Jones domains	2004	Ricardo G. Durán María Amelia Muschietti
+	Structural stability of polynomial second order differential equations with periodic coefficients	2004	Adolfo W. Guzman