English

On Learning for Ambiguous Chance Constrained Problems

Machine Learning 2024-02-13 v2 Optimization and Control

Abstract

We study chance constrained optimization problems minxf(x)\min_x f(x) s.t. P({θ:g(x,θ)0})1ϵP(\left\{ \theta: g(x,\theta)\le 0 \right\})\ge 1-\epsilon where ϵ(0,1)\epsilon\in (0,1) is the violation probability, when the distribution PP is not known to the decision maker (DM). When the DM has access to a set of distributions U\mathcal{U} such that PP is contained in U\mathcal{U}, then the problem is known as the ambiguous chance-constrained problem \cite{erdougan2006ambiguous}. We study ambiguous chance-constrained problem for the case when U\mathcal{U} is of the form {μ:μ(y)ν(y)C,yΘ,μ(y)0}\left\{\mu:\frac{\mu (y)}{\nu(y)}\leq C, \forall y\in\Theta, \mu(y)\ge 0\right\}, where ν\nu is a ``reference distribution.'' We show that in this case the original problem can be ``well-approximated'' by a sampled problem in which NN i.i.d. samples of θ\theta are drawn from ν\nu, and the original constraint is replaced with g(x,θi)0, i=1,2,,Ng(x,\theta_i)\le 0,~i=1,2,\ldots,N. We also derive the sample complexity associated with this approximation, i.e., for ϵ,δ>0\epsilon,\delta>0 the number of samples which must be drawn from ν\nu so that with a probability greater than 1δ1-\delta (over the randomness of ν\nu), the solution obtained by solving the sampled program yields an ϵ\epsilon-feasible solution for the original chance constrained problem.

Keywords

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

R2 v1 2026-06-28T14:05:39.414Z