Semi-infinite assignment problems and related games

Two drawbacks exist with the infinite elements used for simulating the unbounded domains of semi-infinite problems. The first is the lack of an adequate measure for calculating the decay parameter. The second is the frequency-dependent characteristic of the finite/infinite element mesh used for deri

For a min-max problem in the form of minxEx maxtET {A(X)}, the nondi\_fferentiability of the max function F(x) --maxtET {ft(x)} presents special difficulty in finding optimal solutions. We show that an entropic regularization procedure can provide a smooth approximation Fp(x) that uniformly converge

## Abstract This paper gives characterization of optimal Solutions for convex semiinfinite programming problems. These characterizations are free of a constraint qualification assumption. Thus they overcome the deficiencies of the semiinfinite versions of the Fritz John and the Kuhn‐Tucker theories

This paper deals with singular coupled implicit semi-infinite mixed diffusion problems. By application of the sine Fourier transform, existence conditions and an analytic closed form solution is first obtained. Given an admissible error and a rectangular bounded closed domain, analyticnumerical appr

Two models of steady state brittle crack motion are commonly used. They are the models of Yoff6 (1) and of Craggs (2) (similar models have also been used by Barenblatt etc. of the Russian school). As is well known, Yoffr's model consists of a constant finite length crack moving with uniform velocity