Convex polynomial yield functions
From MaRDI portal
Publication:645754
DOI10.1016/J.JMPS.2010.08.005zbMath1225.74017OpenAlexW2068492319WikidataQ59275891 ScholiaQ59275891MaRDI QIDQ645754
Frédéric Barlat, Stefan C. Soare
Publication date: 10 November 2011
Published in: Journal of the Mechanics and Physics of Solids (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jmps.2010.08.005
Anisotropy in solid mechanics (74E10) Small-strain, rate-independent theories of plasticity (including rigid-plastic and elasto-plastic materials) (74C05)
Related Items (6)
Capability of the BBC2008 yield criterion in predicting the earing profile in cup deep drawing simulations ⋮ A study of the Yld2004 yield function and one extension in polynomial form: a new implementation algorithm, modeling range, and earing predictions for aluminum alloy sheets ⋮ Generalized fourth-order Hill's 1979 yield function for modeling sheet metals in plane stress ⋮ On the plastic anisotropy of an aluminium alloy and its influence on constrained multiaxial flow ⋮ A convex fourth order yield function for orthotropic metal plasticity ⋮ A parameter identification scheme for the orthotropic Poly6 yield function satisfying the convexity condition
Cites Work
- All convex invariant functions of hermitian matrices
- Applications of tensor functions in solid mechanics
- A new representation theorem for isotropic functions: An answer to Professor G. F. Smith's criticism of my papers on representations for isotropic functions I: Scalar-valued isotropic functions
- A theory of plastic anisotropy based on yield function of fourth order (plane stress state)-II
- A general anisotropic yield criterion using bounds and a transformation weighting tensor
- A yield function for anisotropic materials application to aluminum alloys.
- Linear transformation-based anisotropic yield functions.
- On representations of anisotropic invariants
- Theoretical considerations upon the MK model for limit strains prediction: the plane strain case, strain-rate effects, yield surface influence, and material heterogeneity
- On the use of homogeneous polynomials to develop anisotropic yield functions with applications to sheet forming
- Orthotropic yield criteria for description of the anisotropy in tension and compression of sheet metals
- Inelastic constitutive relations for solids: An internal-variable theory and its application to metal plasticity
- Prediction of six or eight ears in a drawn cup based on a new anisotropic yield function
- On linear transformations of stress tensors for the description of plastic anisotropy
- A Proof of Minkowski's Inequality for Convex Curves
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
This page was built for publication: Convex polynomial yield functions
