標題: Uniqueness of Equilibrium with Sufficiently Small Strains in Finite Elasticity
作者: Spector, Daniel E.
Spector, Scott J.
應用數學系
Department of Applied Mathematics
公開日期: 1-七月-2019
摘要: The uniqueness of equilibrium for a compressible, hyperelastic body subject to dead-load boundary conditions is considered. It is shown, for both the displacement and mixed problems, that there cannot be two solutions of the equilibrium equations of Finite (Nonlinear) Elasticity whose nonlinear strains are uniformly close to each other. This result is analogous to the result of JOHN (Commun Pure Appl Math 25:617-634, 1972), who proved that, for the displacement problem, there is a most one equilibrium solution with uniformly small strains. The proof in this manuscript utilizes Geometric Rigidity, a new straightforward extension of the Fefferman-Stein inequality to bounded domains, and an appropriate adaptation, for Elasticity, of a result from the Calculus of Variations. Specifically, it is herein shown that the uniform positivity of the second variation of the energy at an equilibrium solution implies that this mapping is a local minimizer of the energy among deformations whose gradient is sufficiently close, in BMO boolean AND L-1 , to the gradient of the equilibrium solution.
URI: http://dx.doi.org/10.1007/s00205-019-01360-1
http://hdl.handle.net/11536/151605
ISSN: 0003-9527
DOI: 10.1007/s00205-019-01360-1
期刊: ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS
Volume: 233
Issue: 1
起始頁: 409
結束頁: 449
顯示於類別:期刊論文