Abstract
Based on the idea of partial Yosida approximation we prove global in time existence of nonhomogeneous initial-boundary value problems for the class of coercive models of monotone type from the theory of inelastic deformations of metals. Then using this result and the coercive limits idea introduced in [8], we approximate self-controlling problems with nonhomogeneous boundary data by a sequence of coercive models and prove a convergence result.
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