Calmness of the Argmin Mapping in Linear Semi-Infinite Optimization

“…al. [1], which gave the impetus for our studies and has been devoted to the following special setting of problem (1) with parameter space T = R n × C(I, R):…”

“…We will focus here to calmness of this multifunction. For the definition of calmness and other Lipschitz-type concepts we refer to Section 2, for more details or recent surveys on calmness see, e.g., [1][2][3][4][5][6][7].…”

“…al. [1], where such a characterization was given for the special class of linear semi-infinite programs under canonical perturbations. It is shown there that, under the Slater CQ, the argmin mapping is calm if and only if some associated linear semi-infinite inequality system is calm.…”

“…Note that the authors of [1] essentially used the structure of the linear semiinfinite setting, the special parametrization, and some subdifferential approach to calmness by Azé and Corvellec [13]. In contrast to it, we will apply both classical tools from parametric optimization (cf., e.g., [14][15][16]) and a basic intersection theorem for calm multifunctions [3,14].…”

“…In Section 3, it will be shown that in our abstract setting (cf. (1) below), the calmness of the argmin mapping at some reference point is implied by the calmness of the mentioned auxiliary mapping, provided that the Slater CQ is replaced, e.g., by the Aubin property of the feasible set mapping at the reference point (which is equivalent to the Slater CQ in the framework of [1]). It is worth noting that the proofs do not use any structure of the feasible set and go only back to classical tools in parametric optimization from the 1980ies.…”

On Calmness of the Argmin Mapping in Parametric Optimization Problems

“…al. [1], which gave the impetus for our studies and has been devoted to the following special setting of problem (1) with parameter space T = R n × C(I, R):…”

“…We will focus here to calmness of this multifunction. For the definition of calmness and other Lipschitz-type concepts we refer to Section 2, for more details or recent surveys on calmness see, e.g., [1][2][3][4][5][6][7].…”

“…al. [1], where such a characterization was given for the special class of linear semi-infinite programs under canonical perturbations. It is shown there that, under the Slater CQ, the argmin mapping is calm if and only if some associated linear semi-infinite inequality system is calm.…”

“…Note that the authors of [1] essentially used the structure of the linear semiinfinite setting, the special parametrization, and some subdifferential approach to calmness by Azé and Corvellec [13]. In contrast to it, we will apply both classical tools from parametric optimization (cf., e.g., [14][15][16]) and a basic intersection theorem for calm multifunctions [3,14].…”

“…In Section 3, it will be shown that in our abstract setting (cf. (1) below), the calmness of the argmin mapping at some reference point is implied by the calmness of the mentioned auxiliary mapping, provided that the Slater CQ is replaced, e.g., by the Aubin property of the feasible set mapping at the reference point (which is equivalent to the Slater CQ in the framework of [1]). It is worth noting that the proofs do not use any structure of the feasible set and go only back to classical tools in parametric optimization from the 1980ies.…”

On Calmness of the Argmin Mapping in Parametric Optimization Problems

Preliminaries on Linear Semi-infinite Optimization

Modeling Uncertain Linear Semi-infinite Optimization Problems