Key points are not available for this paper at this time.
In this paper, we focus on simple bilevel optimization problems, where we minimize a convex smooth objective function over the optimal solution set of another convex smooth constrained optimization problem. We present a novel bilevel optimization method that locally approximates the solution set of the lower-level problem using a cutting plane approach and employs an accelerated gradient-based update to reduce the upper-level objective function over the approximated solution set. We measure the performance of our method in terms of suboptimality and infeasibility errors and provide non-asymptotic convergence guarantees for both error criteria. Specifically, when the feasible set is compact, we show that our method requires at most O (\1/₅, 1/g\) iterations to find a solution that is f-suboptimal and g-infeasible. Moreover, under the additional assumption that the lower-level objective satisfies the r-th H\"olderian error bound, we show that our method achieves an iteration complexity of O (\₅^{-2r-1{2r}, ₆^-2r-1{2r}\}), which matches the optimal complexity of single-level convex constrained optimization when r=1.
Cao et al. (Mon,) studied this question.