English

Complexity guarantees for an implicit smoothing-enabled method for stochastic MPECs

Optimization and Control 2022-06-23 v3

Abstract

Stochastic MPECs have found increasing relevance for modeling a broad range of settings in engineering and statistics. Yet, there seem to be no efficient first/zeroth-order schemes equipped with non-asymptotic rate guarantees for resolving even deterministic variants of such problems. We consider SMPECs where the parametrized lower-level equilibrium problem is given by a deterministic/stochastic VI problem whose mapping is strongly monotone. We develop a zeroth-order implicit algorithmic framework by leveraging a locally randomized spherical smoothing scheme. We present schemes for single-stage and two-stage stochastic MPECs when the upper-level problem is either convex or nonconvex. (I). Single-stage SMPECs: In convex regimes, our proposed inexact schemes are characterized by a complexity in upper-level projections, upper-level samples, and lower-level projections of O(1ϵ2)\mathcal{O}(\tfrac{1}{\epsilon^2}), O(1ϵ2)\mathcal{O}(\tfrac{1}{\epsilon^2}), and O(1ϵ2ln(1ϵ))\mathcal{O}(\tfrac{1}{\epsilon^2}\ln(\tfrac{1}{\epsilon})) , respectively. Analogous bounds for the nonconvex regime are O(1ϵ)\mathcal{O}(\tfrac{1}{\epsilon}), O(1ϵ2)\mathcal{O}(\tfrac{1}{\epsilon^2}), and O(1ϵ3)\mathcal{O}(\tfrac{1}{\epsilon^3}), respectively . (II). Two-stage SMPECs: In convex regimes, our proposed inexact schemes have a complexity in upper-level projections, upper-level samples, and lower-level projections of O(1ϵ2),O(1ϵ2)\mathcal{O}(\tfrac{1}{\epsilon^2}),\mathcal{O}(\tfrac{1}{\epsilon^2}), and O(1ϵ2ln(1ϵ))\mathcal{O}(\tfrac{1}{\epsilon^2}\ln(\tfrac{1}{\epsilon})) while the corresponding bounds in the nonconvex regime are O(1ϵ)\mathcal{O}(\tfrac{1}{\epsilon}), O(1ϵ2)\mathcal{O}(\tfrac{1}{\epsilon^2}), and O(1ϵ2ln(1ϵ))\mathcal{O}(\tfrac{1}{\epsilon^2}\ln(\tfrac{1}{\epsilon})) , respectively . In addition, we derive statements for exact as well as accelerated counterparts. We also provide a comprehensive set of numerical results for validating the theoretical findings.

Keywords

Cite

@article{arxiv.2104.08406,
  title  = {Complexity guarantees for an implicit smoothing-enabled method for stochastic MPECs},
  author = {Shisheng Cui and Uday V. Shanbhag and Farzad Yousefian},
  journal= {arXiv preprint arXiv:2104.08406},
  year   = {2022}
}
R2 v1 2026-06-24T01:15:57.051Z