On error bounds and Newton-type methods for generalized Nash equilibrium problems

Abstract: Error bounds (estimates for the distance to the solution set of a given problem) are key to analyzing convergence rates of computational methods for solving the problem in question, or sometimes even to justifying convergence itself. That said, for the generalized Nash equilibrium problems (GNEP), the theory of error bounds had not been developed in depth comparable to the fields of optimization and variational problems. In this paper, we provide a systematic approach which should be useful for verifying error… Show more

“…Here, we give a different argument which is, in a sense, more direct: we demonstrate that Condition 5 implying the whole set of Assumptions 1-4 holds under noncriticality of the Lagrange multiplier. Observe that the error bound itself is an immediate consequence of Proposition 6.1 below and of [20,Lemma 1].…”

“…Condition 5 below was already considered in [20] and is equivalent to Condition 4 for problem (1.3) with Ω given by (1.4).…”

“…As is explained in [20], if, for each partition (I 1 , I 2 ) of I 0 , some constraint qualification implying the local error bound condition for (5.2) is satisfied at z * , then Condition 5 holds. For example, if MFCQ or RCRCQ holds at z * for system (5.2) for each partition (I 1 , I 2 ) of I 0 , then Condition 5 is valid.…”

“…For example, if MFCQ or RCRCQ holds at z * for system (5.2) for each partition (I 1 , I 2 ) of I 0 , then Condition 5 is valid. In [20], it is actually stated that Condition 5 implies Condition 1 for system (1.3) and so Assumption 2. However, the relation between Condition 5 and Assumption 3 was not analyzed in [20].…”

“…Sections 7 and 8 consider different reformulations of KKT systems associated to generalized Nash equilibrium problems, where we exhibit sufficient conditions for the required error bounds in that setting. Specifically, a result from [20] based on the full row rank of a certain matrix is recovered. In addition, a more general result is presented, showing that even the weaker constant rank of certain matrices is sufficient.…”

Convergence conditions for Newton-type methods applied to complementarity systems with nonisolated solutions

“…Here, we give a different argument which is, in a sense, more direct: we demonstrate that Condition 5 implying the whole set of Assumptions 1-4 holds under noncriticality of the Lagrange multiplier. Observe that the error bound itself is an immediate consequence of Proposition 6.1 below and of [20,Lemma 1].…”

“…Condition 5 below was already considered in [20] and is equivalent to Condition 4 for problem (1.3) with Ω given by (1.4).…”

“…As is explained in [20], if, for each partition (I 1 , I 2 ) of I 0 , some constraint qualification implying the local error bound condition for (5.2) is satisfied at z * , then Condition 5 holds. For example, if MFCQ or RCRCQ holds at z * for system (5.2) for each partition (I 1 , I 2 ) of I 0 , then Condition 5 is valid.…”

“…For example, if MFCQ or RCRCQ holds at z * for system (5.2) for each partition (I 1 , I 2 ) of I 0 , then Condition 5 is valid. In [20], it is actually stated that Condition 5 implies Condition 1 for system (1.3) and so Assumption 2. However, the relation between Condition 5 and Assumption 3 was not analyzed in [20].…”

“…Sections 7 and 8 consider different reformulations of KKT systems associated to generalized Nash equilibrium problems, where we exhibit sufficient conditions for the required error bounds in that setting. Specifically, a result from [20] based on the full row rank of a certain matrix is recovered. In addition, a more general result is presented, showing that even the weaker constant rank of certain matrices is sufficient.…”

Convergence conditions for Newton-type methods applied to complementarity systems with nonisolated solutions

Quasi-Equilibria

Revisiting Path-Following to Solve the Generalized Nash Equilibrium Problem