We consider unconstrained minimax problems where the objective function is the maximum of a finite number of smooth functions. We prove that, under usual assumptions, it is possible to construct a continuously differentiable function, whose minimizers yield the minimizers of the max function and the corresponding minimum values. On this basis, we can define implementable algorithms for the solution of the minimax problem, which are globally convergent at a superlinear convergence rate. Preliminary numerical results are reported.
A smooth method for the finite minimax problem / DI PILLO, Gianni; Grippo, Luigi; Lucidi, Stefano. - In: MATHEMATICAL PROGRAMMING. - ISSN 0025-5610. - STAMPA. - 60:(1993), pp. 187-214. [10.1007/BF01580609]
A smooth method for the finite minimax problem
DI PILLO, Gianni;GRIPPO, Luigi;LUCIDI, Stefano
1993
Abstract
We consider unconstrained minimax problems where the objective function is the maximum of a finite number of smooth functions. We prove that, under usual assumptions, it is possible to construct a continuously differentiable function, whose minimizers yield the minimizers of the max function and the corresponding minimum values. On this basis, we can define implementable algorithms for the solution of the minimax problem, which are globally convergent at a superlinear convergence rate. Preliminary numerical results are reported.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
