First-Order Algorithms for Generalized Semi-Infinite Min-Max Problems

We present a first-order algorithm for solving semi-infinite generalized min-max problems which consist of minimizing a function f0(x) = F(ψ1(x), .... , ψm(x)), where F is a smooth function and each ψi is the maximum of an infinite number of smooth functions.In Section 3.3 of [17] Polak finds a methodology for solving infinite dimensional problems by expanding them into an infinite sequence of consistent finite dimensional approximating problems, and then using a master algorithm that selects an appropriate subsequence of these problems and applies a number of iterations of a finite dimensional optimization algorithm to each of these problems, sequentially. Our algorithm was constructed within this framework; it calls an algorithm by Kiwiel as a subroutine. The number of iterations of the Kiwiel algorithm to be applied to the approximating problems is determined by a test that ensures that the overall scheme retains the rate of convergence of the Kiwiel algorithm.Under reasonable assumptions we show that all the accumulation points of sequences constructed by our algorithm are stationary, and, under an additional strong convexity assumption, that the Kiwiel algorithm converges at least linearly, and that our algorithm also converges at least linearly, with the same rate constant bounds as Kiwiel's.

[1]  Krzysztof C. Kiwiel,et al.  A quadratic approximation method for minimizing a class of quasidifferentiable functions , 1984 .

[2]  E. Polak Basics of Minimax Algorithms , 1989 .

[3]  Lyudmila N. Polyakova On the minimization of a quasidifferentiable function subject to equality-type quasidifferentiable constraints , 1986 .

[4]  K. C. Kiwiel Randomized search directions in descent methods for minimizing certain quasidifferentiable functions , 1986 .

[5]  K. Kiwiel A linearization method for minimizing certain quasidifferentiable functions , 1986 .

[6]  Elijah Polak,et al.  On the rate of convergence of certain methods of centers , 1972, Math. Program..

[7]  D. Bertsekas Nondifferentiable optimization via approximation , 1975 .

[8]  B. N. Pshenichnyi,et al.  Numerical Methods in Extremal Problems. , 1978 .

[9]  Elijah Polak,et al.  On the use of consistent approximations in the solution of semi-infinite optimization and optimal control problems , 1993, Math. Program..

[10]  V. F. Demyanov,et al.  Quasidifferentiable functions: necessary conditions and descent directions , 1986 .

[11]  G. Papavassilopoulos Algorithms for a class of nondifferentiable problems , 1981 .

[12]  V. Demyanov,et al.  An algorithm for minimizing a certain class of quasidifferentiable functions , 1986 .

[13]  Ludwig Kuntz,et al.  The method of common descent for a certain class of quasidifferentiable functions , 1991 .

[14]  Elijah Polak,et al.  Optimization: Algorithms and Consistent Approximations , 1997 .

[15]  L. Grippo,et al.  Smooth Transformation of the Generalized Minimax Problem , 1997 .

[16]  E. Polak,et al.  Rate-preserving discretization strategies for semi-infinite programming and optimal control , 1992 .

[17]  Masao Fukushima,et al.  A descent algorithm for nonsmooth convex optimization , 1984, Math. Program..

[18]  Krzysztof C. Kiwiel,et al.  Descent methods for quasidifferentiable minimization , 1988 .