Mirror descent algorithms with productive/non-productive step switching achieve optimal convergence rates for bounded monotone operators and Lipschitz convex functional constraints in variational inequalities.
–With stopping criterion 2, we get ⟨F(x),bx−x⟩< εL F +δ+ MgDLF |I| X i∈I 1 ∥∇g(xi)∥2∗ ∀x∈Q
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Mirror Descent-Type Algorithms for the Variational Inequality Problem with Functional Constraints
Mirror descent algorithms with productive/non-productive step switching achieve optimal convergence rates for bounded monotone operators and Lipschitz convex functional constraints in variational inequalities.