An evolutionary vector-valued variational inequality and Lagrange multiplier
Abstract
We prove existence and uniqueness of solution of an evolutionary vector-valued variational inequality defined in the convex set of vector valued functions v subject to the constraint | v|1. We show that we can write the variational inequality as a system of equations on the unknowns (λ, u), where λ is a (unique) Lagrange multiplier belonging to Lp and u solves the variational inequality. Given data ( fn, un0) converging to ( f, u0) in L∞(QT)× H10(), we prove the convergence of the solutions (λn, un) of the Lagrange multiplier problem to the solution of the limit problem, when we let n→ ∞.
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