RESTRICTIONS ON CONSTITUTIVE EQUATIONS OF FINITELY DEFORMED ELASTIC-PLASTIC MATERIALS
From MaRDI portal
Publication:4080801
DOI10.1093/qjmam/28.1.25zbMath0318.73002OpenAlexW1999630478MaRDI QIDQ4080801
Publication date: 1975
Published in: The Quarterly Journal of Mechanics and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1093/qjmam/28.1.25
Plastic materials, materials of stress-rate and internal-variable type (74C99) Theory of constitutive functions in solid mechanics (74A20) Elastic materials (74B99) Materials of strain-rate type and history type, other materials with memory (including elastic materials with viscous damping, various viscoelastic materials) (74D99)
Related Items
Strongly objective numerical implementation and generalization of a unified large inelastic deformation model with a smooth elastic-inelastic transition, Energy consistent algorithms for dynamic finite deformation plasticity, On the advantages of a geometrical viewpoint in the derivation of Lagrange's equations for a rigid continuum, Paul M. Naghdi (1924-1994), A remark on consequences of the work assumption of Naghdi and Trapp for elastic-plastic materials, On theory and numerics of large viscoplastic deformation, Large deformation plasticity. From basic relations to finite deformation, Application of the maximum rate of dissipation criterion to dilatant, pressure dependent plasticity models, On the mechanics of large inelastic deformations: Kinematics and constitutive modeling, On the formulation and numerical solution of problems in anisotropic finite plasticity, Elastoplasticity beyond small deformations, A critical review of the state of finite plasticity, A general framework for the numerical solution of problems in finite elasto-plasticity, A constitutive restriction related to convexity of yield surfaces in plasticity, Dissipative Nature of Plastic Deformations in Finite Anisotropic Elasto-Plasticity, Elastic-plastic strain hardening response of porous metals, A covariant formulation of anisotropic finite plasticity: theoretical developments, A unified approach to finite deformation elastoplastic analysis based on the use of hyperelastic constitutive equations
