An important part in the development of numerical strategies for the solution of physical problems consists in evaluating the quality of the solution, for example via the estimation of the associated error. Error estimation requires the availability of a more accurate (numerical) solution, to be used for comparison. Within the context of finite element modelling, a number of recovery procedures have been recently proposed, aimed at providing such accurate solutions at a reasonable computational cost. Most of the available recovery procedures were formulated within the context of linear elastic material models, their extension to nonlinear cases becoming crucial to broaden the spectrum of model verification techniques. A particularly promis...