The loss of uniform elongation with decreasing grain size in polycrystals was analysed using a strain gradient plasticity-based finite-element model involving an enhanced description of the grain boundaries. The grain interiors were modelled by the finite strain version of the isotropic Fleck–Hutchinson theory with one internal length parameter. The grain boundaries were modelled using cohesive zone elements imposing higher-order boundary conditions at the interface between the grain interior and grain boundary layer. The plastic strain rate was initially set to zero at these interfaces to account for their impenetrability to dislocations. With increasing stress levels, the higher-order constraint could be suppressed in order to mimic grain boundary relaxation mechanisms. The model was validated towards experimental data on ferritic steels with grain sizes varying between 100 nm and 10μm. The model reproduces not only the yield stress evolution, but also the drop of ductility taking place around 1μm grain size while using a single constant internal length. Relaxation of the grain boundary constraint was needed to correctly predict the response at the smallest grain sizes. The back stress increases with decreasing grain sizes. Additional analysis of bimodal grain size distributions was provided showing a large potential for ductility enhancement.

Strain Gradient Plasticity Analysis of the Grain-Size-Dependent Strength and Ductility of Polycrystals with Evolving Grain Boundary Confinement. T.J.Massart, T.Pardoen: Acta Materialia, 2010, 58[17], 5768-81