Symplectic solution for three dimensional couple stress problem and its variational principle 被引量：2

Symplectic solution for three dimensional couple stress problem and its variational principle

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摘要 A new state vector is presented for symplectic solution to three dimensional couple stress problem. Without relying on the analogy relationship, the dual PDEs of couple stress problem are derived by a new state vector. The duality solution methodology in a new form is thus extended to three dimensional couple stress. A new symplectic orthonormality relationship is proved. The symplectic solution to couple stress theory based a new state vector is more accordant with the custom of classical elasticity and is more convenient to process boundary conditions. A Hamilton mixed energy variational principle is derived by the integral method. A new state vector is presented for symplectic solution to three dimensional couple stress problem. Without relying on the analogy relationship, the dual PDEs of couple stress problem are derived by a new state vector. The duality solution methodology in a new form is thus extended to three dimensional couple stress. A new symplectic orthonormality relationship is proved. The symplectic solution to couple stress theory based a new state vector is more accordant with the custom of classical elasticity and is more convenient to process boundary conditions. A Hamilton mixed energy variational principle is derived by the integral method.

作者 JianhuiLuo GuangdongLiu WanxieZhong

机构地区 CollegeofCivilEngineering KeyStateLaboratoryofStructuralAnalysisforIndustrialEquipment

出处《Acta Mechanica Sinica》 SCIE EI CAS CSCD 2005年第1期70-75,共6页 力学学报（英文版）

关键词 Couple stress Duality solution system Symplectic geometry Eigen-solution expansion Couple stress Duality solution system Symplectic geometry Eigen-solution expansion

分类号 O34 [理学—固体力学]

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