Another approach to linearized elasticity and a new proof of Korn's inequality

Philippe G. Ciarlet; Patrick Ciarlet

doi:10.1142/S0218202505000352

Another approach to linearized elasticity and a new proof of Korn's inequality

Philippe G. Ciarlet, Patrick Ciarlet

City University of Hong Kong

Research output: Contribution to journal › Article › peer-review

Abstract

We describe and analyze an approach to the pure traction problem of three-dimensional linearized elasticity, whose novelty consists in considering the linearized strain tensor as the "primary" unknown, instead of the displacement itself as is customary. This approach leads to a well-posed minimization problem, constrained by a weak form of the St Venant compatibility conditions. Interestingly, it also provides a new proof of Korn's inequality.

Original language	English
Pages (from-to)	259-271
Number of pages	13
Journal	Mathematical Models and Methods in Applied Sciences
Volume	15
Issue number	2
DOIs	https://doi.org/10.1142/S0218202505000352
Publication status	Published - 1 Jan 2005

Keywords

Korn's inequality
St Venant compatibility conditions
Three-dimensional linearized elasticity

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10.1142/S0218202505000352

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AB - We describe and analyze an approach to the pure traction problem of three-dimensional linearized elasticity, whose novelty consists in considering the linearized strain tensor as the "primary" unknown, instead of the displacement itself as is customary. This approach leads to a well-posed minimization problem, constrained by a weak form of the St Venant compatibility conditions. Interestingly, it also provides a new proof of Korn's inequality.

KW - Korn's inequality

KW - St Venant compatibility conditions

KW - Three-dimensional linearized elasticity

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M3 - Article

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Another approach to linearized elasticity and a new proof of Korn's inequality

Abstract

Keywords

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