On Learning for Ambiguous Chance Constrained Problems
Abstract
We study chance constrained optimization problems s.t. where is the violation probability, when the distribution is not known to the decision maker (DM). When the DM has access to a set of distributions such that is contained in , then the problem is known as the ambiguous chance-constrained problem \cite{erdougan2006ambiguous}. We study ambiguous chance-constrained problem for the case when is of the form , where is a ``reference distribution.'' We show that in this case the original problem can be ``well-approximated'' by a sampled problem in which i.i.d. samples of are drawn from , and the original constraint is replaced with . We also derive the sample complexity associated with this approximation, i.e., for the number of samples which must be drawn from so that with a probability greater than (over the randomness of ), the solution obtained by solving the sampled program yields an -feasible solution for the original chance constrained problem.
Cite
@article{arxiv.2401.00547,
title = {On Learning for Ambiguous Chance Constrained Problems},
author = {A Ch Madhusudanarao and Rahul Singh},
journal= {arXiv preprint arXiv:2401.00547},
year = {2024}
}
Comments
We have "not considered the uniform bound" for violation probabilities corresponding to the set of distributions in the ambiguity set