Distributionally robust polynomial chance-constraints under mixture ambiguity sets

Abstract

Given X ⊂ Rn, ∈ (0,1), a parametrized family of probability distributions (μ\a)\a∈ A on ⊂ Rp, we consider the feasible set X*\⊂ X associated with the distributionally robust chance-constraint \[X*\\,=\,\x ∈ X :\: Prob\μ[f(x,ω)\,>\,0]> 1-,\,∀μ∈ M\a\,\]where M\a is the set of all possibles mixtures of distributions μ\a, a∈ A.For instance and typically, the familyM\a is the set of all mixtures ofGaussian distributions on R with mean and standard deviation a=(a,σ) in some compact set A⊂ R2.We provide a sequence of inner approximations Xd\=\x∈ X: w\d(x) <\, d∈ N, where w\d is a polynomial of degree d whosevector of coefficients is an optimal solution of a semidefinite program.The size of the latter increases with the degree d. We also obtain the strong and highly desirable asymptotic guarantee that λ(X*\ Xd\)0as d increases, where λ is the Lebesgue measure on X. Same resultsare also obtained for the more intricated case of distributionally robust "joint" chance-constraints.