论文信息 - Continuity of Generalized Gradients and Multipliers Under Perturbations

Continuity of Generalized Gradients and Multipliers Under Perturbations

We prove that the multiplier rule, given by Clarke for mathematical programming problems with locally Lipschitz data, is stable under epi-convergent data perturbations in the finite-dimensional case for global solutions. This stability result is derived from a continuity theorem for generalized gradients extending the classical formula lim (nabla) f n = (nabla)(lim f n ).Continuous dependence theorems for multipliers in the Fritz-John form proved in this paper extend stability results of Gauvin, Robinson and others for nonlinear programming problems with smooth data.

Tullio Zolezzi | T. Zolezzi

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