English

Optimistic Online Convex Optimization in Dynamic Environments

Machine Learning 2022-03-29 v1 Optimization and Control

Abstract

In this paper, we study the optimistic online convex optimization problem in dynamic environments. Existing works have shown that Ader enjoys an O((1+PT)T)O\left(\sqrt{\left(1+P_T\right)T}\right) dynamic regret upper bound, where TT is the number of rounds, and PTP_T is the path length of the reference strategy sequence. However, Ader is not environment-adaptive. Based on the fact that optimism provides a framework for implementing environment-adaptive, we replace Greedy Projection (GP) and Normalized Exponentiated Subgradient (NES) in Ader with Optimistic-GP and Optimistic-NES respectively, and name the corresponding algorithm ONES-OGP. We also extend the doubling trick to the adaptive trick, and introduce three characteristic terms naturally arise from optimism, namely MTM_T, M~T\widetilde{M}_T and VT+1L2ρ(ρ+2PT)ϱ2VTDTV_T+1_{L^2\rho\left(\rho+2 P_T\right)\leqslant\varrho^2 V_T}D_T, to replace the dependence of the dynamic regret upper bound on TT. We elaborate ONES-OGP with adaptive trick and its subgradient variation version, all of which are environment-adaptive.

Keywords

Cite

@article{arxiv.2203.14520,
  title  = {Optimistic Online Convex Optimization in Dynamic Environments},
  author = {Qing-xin Meng and Jian-wei Liu},
  journal= {arXiv preprint arXiv:2203.14520},
  year   = {2022}
}

Comments

An early version of this manuscript can be found at https://openreview.net/forum?id=T3_cV3-zbg

R2 v1 2026-06-24T10:27:54.914Z