General equations, double hormonic equations and eigen-equations in problems of ideal plasticity
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Publication:1080690
DOI10.1007/BF01896253zbMath0599.73032MaRDI QIDQ1080690
Publication date: 1986
Published in: Applied Mathematics and Mechanics. (English Edition) (Search for Journal in Brave)
Nonlinear elasticity (74B20) Plastic materials, materials of stress-rate and internal-variable type (74C99)
Related Items (2)
The Schrödinger equation in theory of plates and shells with orthorhombic anisotropy ⋮ Further study of the relation of von Kármán equation for elastic large deflection problem and Schrödinger equation for quantum eigenvalue problem
Cites Work
- On the general equations of axisymmetric problems of ideal plasticity
- Dynamical stress function tensor
- The solution of the problem of deflection of an elastic thin plate by the joint action of dynamical lateral pressure, force in central surface and external field on the elastic base
- The relation between the von Kármán equation for the elastic large deflection problem and the Schrödinger equation for the quantum eigenvalues problem
- General solution of elastodynamics
- Finite element analysis of axisymmetric elastic body problems
- On the general equations of problems of axial symmetry in the theory of plasticity
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