2005-04-26Buch DOI: 10.18452/8340
Lipschitz and differentiability properties of quasi-concave and singular normal distribution functions
The paper provides a condition for differentiability as well as an equivalent criterion for Lipschitz continuity of singular normal distributions. Such distributions are of interest, for instance, in stochastic optimization problems with probabilistic constraints, where a comparatively small (nondegenerate-) normally distributed random vector induces a large number of linear inequality constraints (e.g. networks with stochastic demands). The criterion for Lipschitz continuity is established for the class of quasi-concave distributions which the singular normal distribution belongs to.
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Is Part Of Series: Stochastic Programming E-Print Series - 11, SPEPS