On Learning for Ambiguous Chance Constrained Problems

Abstract

We study chance constrained optimization problems x f(x) s.t. P(\ θ: g(x,θ) 0 \) 1-ε where ε∈ (0,1) is the violation probability, when the distribution P is not known to the decision maker (DM). When the DM has access to a set of distributions U such that P is contained in U, then the problem is known as the ambiguous chance-constrained problem erdougan2006ambiguous. We study ambiguous chance-constrained problem for the case when U is of the form \μ:μ (y)(y)≤ C, ∀ y∈, μ(y) 0\, where is a ``reference distribution.'' We show that in this case the original problem can be ``well-approximated'' by a sampled problem in which N i.i.d. samples of θ are drawn from , and the original constraint is replaced with g(x,θi) 0,~i=1,2,…,N. We also derive the sample complexity associated with this approximation, i.e., for ε,δ>0 the number of samples which must be drawn from so that with a probability greater than 1-δ (over the randomness of ), the solution obtained by solving the sampled program yields an ε-feasible solution for the original chance constrained problem.

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