Dynamic Regret for Online Composite Optimization

This paper investigates online composite optimization in dynamic environments, where each objective or loss function contains a time-varying nondifferentiable regularizer. To resolve it, an online proximal gradient algorithm is studied for two distinct scenarios, including convex and strongly convex objectives without the smooth condition. In both scenarios, unlike most of works, an extended version of the conventional path variation is employed to bound the considered performance metric, i.e., dynamic regret. In the convex scenario, a bound $\mathcal{O}(\sqrt{T^{1-\beta}D_\beta(T)+T})$ is obtained which is comparable to the best-known result, where $D_\beta(T)$ is the extended path variation with $\beta\in[0,1)$ and $T$ being the total number of rounds. In strongly convex case, a bound $\mathcal{O}(\log T(1+T^{-\beta}D_\beta(T)))$ on the dynamic regret is established. In the end, numerical examples are presented to support the theoretical findings.

[1]  C. Poon,et al.  Variable Screening for Sparse Online Regression , 2022, Journal of Computational and Graphical Statistics.

[2]  Xinlei Yi,et al.  Distributed Online Convex Optimization With an Aggregative Variable , 2020, IEEE Transactions on Control of Network Systems.

[3]  Ji Liu,et al.  Proximal Online Gradient Is Optimum for Dynamic Regret: A General Lower Bound , 2021, IEEE Transactions on Neural Networks and Learning Systems.

[4]  Mihailo R. Jovanovic,et al.  A Second Order Primal-Dual Method for Nonsmooth Convex Composite Optimization , 2017, IEEE Transactions on Automatic Control.

[5]  A. Wallace,et al.  Approximate Proximal-Gradient Methods , 2021, 2021 Sensor Signal Processing for Defence Conference (SSPD).

[6]  Shaowei Wang,et al.  Inter-Slice Radio Resource Management via Online Convex Optimization , 2021, ICC 2021 - IEEE International Conference on Communications.

[7]  Gonzalo Mateos,et al.  Online proximal gradient for learning graphs from streaming signals , 2021, 2020 28th European Signal Processing Conference (EUSIPCO).

[8]  Ketan Rajawat,et al.  Dynamic Online Learning via Frank-Wolfe Algorithm , 2021, IEEE Transactions on Signal Processing.

[9]  Peng Zhao,et al.  Improved Analysis for Dynamic Regret of Strongly Convex and Smooth Functions , 2020, L4DC.

[10]  Baltasar Beferull-Lozano,et al.  Online Hyperparameter Search Interleaved with Proximal Parameter Updates , 2020, 2020 28th European Signal Processing Conference (EUSIPCO).

[11]  Yiguang Hong,et al.  Distributed Mirror Descent for Online Composite Optimization , 2020, IEEE Transactions on Automatic Control.

[12]  Emiliano Dall'Anese,et al.  Distributed and Inexact Proximal Gradient Method for Online Convex Optimization , 2020, 2021 European Control Conference (ECC).

[13]  Ali H. Sayed,et al.  Decentralized Proximal Gradient Algorithms With Linear Convergence Rates , 2019, IEEE Transactions on Automatic Control.

[14]  Ketan Rajawat,et al.  Online Learning Over Dynamic Graphs via Distributed Proximal Gradient Algorithm , 2019, IEEE Transactions on Automatic Control.

[15]  Lihua Xie,et al.  Distributed Online Optimization for Multi-Agent Networks With Coupled Inequality Constraints , 2018, IEEE Transactions on Automatic Control.

[16]  Csaba Szepesvári,et al.  A modular analysis of adaptive (non-)convex optimization: Optimism, composite objectives, variance reduction, and variational bounds , 2020, Theor. Comput. Sci..

[17]  Mohan Krishna Nutalapati,et al.  Online Trajectory Optimization Using Inexact Gradient Feedback for Time-Varying Environments , 2020, IEEE Transactions on Signal Processing.

[18]  Andrea Simonetto,et al.  Inexact Online Proximal-gradient Method for Time-varying Convex Optimization , 2019, 2020 American Control Conference (ACC).

[19]  Karl Henrik Johansson,et al.  Distributed Online Convex Optimization With Time-Varying Coupled Inequality Constraints , 2019, IEEE Transactions on Signal Processing.

[20]  Xiaofeng Cao,et al.  Fully Projection-Free Proximal Stochastic Gradient Method With Optimal Convergence Rates , 2020, IEEE Access.

[21]  Hao Yu,et al.  A Low Complexity Algorithm with O(√T) Regret and O(1) Constraint Violations for Online Convex Optimization with Long Term Constraints , 2020, J. Mach. Learn. Res..

[22]  Ketan Rajawat,et al.  Online Learning With Inexact Proximal Online Gradient Descent Algorithms , 2018, IEEE Transactions on Signal Processing.

[23]  Lijun Zhang,et al.  Adaptive Online Learning in Dynamic Environments , 2018, NeurIPS.

[24]  Adrien B. Taylor,et al.  Exact Worst-Case Convergence Rates of the Proximal Gradient Method for Composite Convex Minimization , 2017, Journal of Optimization Theory and Applications.

[25]  Wensheng Zhang,et al.  Learning a Coupled Linearized Method in Online Setting , 2017, IEEE Transactions on Neural Networks and Learning Systems.

[26]  Qing Ling,et al.  An Online Convex Optimization Approach to Proactive Network Resource Allocation , 2017, IEEE Transactions on Signal Processing.

[27]  Jinfeng Yi,et al.  Improved Dynamic Regret for Non-degenerate Functions , 2016, NIPS.

[28]  Elad Hazan,et al.  Introduction to Online Convex Optimization , 2016, Found. Trends Optim..

[29]  Aryan Mokhtari,et al.  Optimization in Dynamic Environments : Improved Regret Rates for Strongly Convex Problems , 2016 .

[30]  Gregory Ditzler,et al.  Learning in Nonstationary Environments: A Survey , 2015, IEEE Computational Intelligence Magazine.

[31]  Omar Besbes,et al.  Non-Stationary Stochastic Optimization , 2013, Oper. Res..

[32]  Qing Tao,et al.  Stochastic Learning via Optimizing the Variational Inequalities , 2014, IEEE Transactions on Neural Networks and Learning Systems.

[33]  Tianbao Yang,et al.  An efficient primal dual prox method for non-smooth optimization , 2012, Machine Learning.

[34]  Xi Chen,et al.  Optimal Regularized Dual Averaging Methods for Stochastic Optimization , 2012, NIPS.

[35]  Saeed Ghadimi,et al.  Optimal Stochastic Approximation Algorithms for Strongly Convex Stochastic Composite Optimization I: A Generic Algorithmic Framework , 2012, SIAM J. Optim..

[36]  Isao Yamada,et al.  Adaptive proximal forward-backward splitting for sparse system identification under impulsive noise , 2012, 2012 Proceedings of the 20th European Signal Processing Conference (EUSIPCO).

[37]  Isao Yamada,et al.  Acceleration of adaptive proximal forward-backward splitting method and its application to sparse system identification , 2011, 2011 IEEE International Conference on Acoustics, Speech and Signal Processing (ICASSP).

[38]  Ambuj Tewari,et al.  Composite objective mirror descent , 2010, COLT 2010.

[39]  Isao Yamada,et al.  A sparse adaptive filtering using time-varying soft-thresholding techniques , 2010, 2010 IEEE International Conference on Acoustics, Speech and Signal Processing.

[40]  James T. Kwok,et al.  Accelerated Gradient Methods for Stochastic Optimization and Online Learning , 2009, NIPS.

[41]  Yoram Singer,et al.  Efficient Online and Batch Learning Using Forward Backward Splitting , 2009, J. Mach. Learn. Res..

[42]  Martin Zinkevich,et al.  Online Convex Programming and Generalized Infinitesimal Gradient Ascent , 2003, ICML.