Recursive Optimization of Convex Risk Measures: Mean-Semideviation Models

Abstract

We develop recursive, data-driven, stochastic subgradient methods for optimizing a new, versatile, and application-driven class of convex risk measures, termed here as mean-semideviations, strictly generalizing the well-known and popular mean-upper-semideviation. We introduce the MESSAGEp algorithm, which is an efficient compositional subgradient procedure for iteratively solving convex mean-semideviation risk-averse problems to optimality. We analyze the asymptotic behavior of the MESSAGEp algorithm under a flexible and structure-exploiting set of problem assumptions. In particular: 1) Under appropriate stepsize rules, we establish pathwise convergence of the MESSAGEp algorithm in a strong technical sense, confirming its asymptotic consistency. 2) Assuming a strongly convex cost, we show that, for fixed semideviation order p>1 and for ε∈[0,1), the MESSAGEp algorithm achieves a squared- L2 solution suboptimality rate of the order of O(n-(1-ε)/2) iterations, where, for ε>0, pathwise convergence is simultaneously guaranteed. This result establishes a rate of order arbitrarily close to O(n-1/2), while ensuring strongly stable pathwise operation. For p1, the rate order improves to O(n-2/3), which also suffices for pathwise convergence, and matches previous results. 3) Likewise, in the general case of a convex cost, we show that, for any ε∈[0,1), the MESSAGEp algorithm with iterate smoothing achieves an L1 objective suboptimality rate of the order of O(n-(1-ε)/(41\ p>1\ +4)) iterations. This result provides maximal rates of O(n-1/4), if p1, and O(n-1/8), if p>1, matching the state of the art, as well.