A set of evolution equations for dislocation density was developed incorporating the combined evolution of statistically stored and geometrically necessary densities. The statistical density evolves through Burgers vector-conserving reactions based in dislocation mechanics. The geometric density evolves due to the divergence of dislocation fluxes associated with the inhomogeneous nature of plasticity in crystals. Integration of the density-based model requires additional dislocation density/density-flux boundary conditions to complement the standard traction/displacement boundary conditions. The dislocation density evolution equations and the coupling of the dislocation density flux to the slip deformation in a continuum crystal plasticity model were incorporated into a finite element model. Simulations of an idealized crystal with a simplified slip geometry were conducted to demonstrate the length scale-dependence of the mechanical behavior of the constitutive model. The model formulation and simulation results have direct implications on the ability to model explicitly the interaction of dislocation densities with grain boundaries and on the net effect of grain boundaries on the macroscopic mechanical response of polycrystals.

On the Evolution of Crystallographic Dislocation Density in Non-Homogeneously Deforming Crystals. A.Arsenlis, D.M.Parks, R.Becker, V.V.Bulatov: Journal of the Mechanics and Physics of Solids, 2004, 52[6], 1213-46