| Continuum Elastoplasticity Theory : An Approach Based on Differential Geometry Lalaonirina Rakotomanana1; 1UNIVERSITé DE RENNES 1, Rennes, France; PAPER: 319/Modelling/Regular (Oral) SCHEDULED: 16:20/Wed. 30 Nov. 2022/Similan 1 ABSTRACT: An elastic-plastic continuum theory is developed based on the incompatibility of the deformation. An approach based on the differential geometry of Riemann-Cartan seems the appropriate tool for this purpose. The work gives some insights to the linking the relative gravitation and the theory of incompatible deformations of continuum. Plastic deformation is defined from the deformation incompatibilities and then by means of affine connection in addition to metric tensor. Two approaches for elastoplastic models are investigated : the first is based on the Internal State Variables with a dissipation potential, and the second starts with the definition of a Lagrangian combined with the Poincaré’s Invariance to obtain addition conservation laws involving stress, and hyper-stresses (or hyper-momenta), analogous of micro- stress and polar micro-stress. The general approach is in fine applied to Relative Gravitation and Continuum Plasticity to obtain conservation laws. References: Rakotomanana RL. Contribution à la modélisation géométrique et thermodynamique d’une classe de milieux faiblement continus, Archives for Rational Mechanics and Analysis 141, 1997, pp 199-236. Rakotomanana RL. A geometric approach to thermomechanics of dissipating con- tinua, in Progress in Mathematical Physics Series, Birkhau ̈ser, Boston, 2003. Rakotomanana RL. Covariance and Gauge Invariance in Continuum Physics, in Progress in Mathematical Physics Series, Birkhau ̈ser, Cham, 2018. Rakotomanana RL. More on the Geometric Approach for Gravitation Cou- pled with Electromagnetism within a Riemann-Cartan Vacuum Spacetime, https://hal.archives-ouvertes.fr/hal-03216920, 2021, pp 1-19. |
