Consistent derivation of the constitutive algorithm for plane stress isotropic plasticity. I: Theoretical formulation
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Publication:838566
DOI10.1016/j.ijsolstr.2008.08.012zbMath1168.74320OpenAlexW2059711837MaRDI QIDQ838566
Nunziante Valoroso, Luciano Rosati
Publication date: 26 August 2009
Published in: International Journal of Solids and Structures (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.ijsolstr.2008.08.012
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Cites Work
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- Consistent tangent operators for rate-independent elastoplasticity
- Consistent derivation of the constitutive algorithm for plane stress isotropic plasticity. II: Computational issues
- Structure of constitutive equations in plasticity for different choices of state and control variables
- Some properties of the set of fourth-order tensors, with application to elasticity
- Computational inelasticity
- A general approach to the evaluation of consistent tangent operators for rate-independent elastoplasticity
- An introduction to continuum mechanics
- Integration algorithm forJ2 elastoplasticity under arbitrary mixed stress-strain control
- The zero-normal-stress condition in plane-stress and shell elastoplasticity
- A return mapping algorithm for plane stress elastoplasticity
- Mechanics of Solid Materials
- Studies on generalized midpoint integration in rate-independent plasticity with reference to plane stress J2-flow theory
- A stress integration algorithm for plane stress elastoplasticity and its applications to explicit finite element analysis of sheet metal forming processes
- Implicit plane stress algorithm for multilayerJ2-plasticity using the Prager–Ziegler translation rule
- Numerical techniques for plasticity computations in finite element analysis
- Using finite strain 3D‐material models in beam and shell elements
- Solution procedures for \(J_3\) plasticity and viscoplasticity
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