Continuity constraints at interfaces and their consequences on the work hardening of metal-matrix composites
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Publication:361495
DOI10.1016/j.jmps.2011.07.006zbMath1270.74019OpenAlexW2044477437MaRDI QIDQ361495
Publication date: 29 August 2013
Published in: Journal of the Mechanics and Physics of Solids (Search for Journal in Brave)
Full work available at URL: http://www.sciencedirect.com/science/article/pii/S0022509611001438
crystal plasticityfinite elementsdislocationsfield dislocation mechanicsparticulate reinforced materials
Structured surfaces and interfaces, coexistent phases (74A50) Finite element methods applied to problems in solid mechanics (74S05) Composite and mixture properties (74E30)
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- A comparison of a statistical-mechanics based plasticity model with discrete dislocation plasticity calculations
- Intra-granular plastic slip heterogeneities: dDiscrete vs. mean field approaches
- Continuity in the plastic strain rate and its influence on texture evolution
- Grain-size effect in viscoplastic polycrystals at moderate strains
- Continuum micro-mechanics of elastoplastic polycrystals
- Size effects and idealized dislocation microstructure at small scales: predictions of a phenomenological model of mesoscopic field dislocation mechanics. I.
- Continuous Distributions of Dislocations: Surface Dislocations and the Crystallography of Martensitic Transformations
- The determination of the elastic field of an ellipsoidal inclusion, and related problems
- A tangent modulus method for rate dependent solids
- New Perspectives in Plasticity Theory: Dislocation Nucleation, Waves, and Partial Continuity of Plastic Strain Rate
- Driving forces and boundary conditions in continuum dislocation mechanics
- Plastic flow in a composite: A comparison of nonlocal continuum and discrete dislocation predictions
- A model of crystal plasticity based on the theory of continuously distributed dislocations
