Convergence Rate of a Functional Learning Method for Contextual Stochastic Optimization
Abstract
We consider a stochastic optimization problem involving two random variables: a context variable and a dependent variable . The objective is to minimize the expected value of a nonlinear loss functional applied to the conditional expectation , where is a nonlinear function and represents the decision variables. We focus on the practically important setting in which direct sampling from the conditional distribution of is infeasible, and only a stream of i.i.d.\ observation pairs is available. In our approach, the conditional expectation is approximated within a prespecified parametric function class. We analyze a simultaneous learning-and-optimization algorithm that jointly estimates the conditional expectation and optimizes the outer objective, and establish that the method achieves a convergence rate of order , where denotes the number of observed pairs.
Cite
@article{arxiv.2603.13048,
title = {Convergence Rate of a Functional Learning Method for Contextual Stochastic Optimization},
author = {Noel Smith and Andrzej Ruszczynski},
journal= {arXiv preprint arXiv:2603.13048},
year = {2026}
}