Decentralized Projection-free Online Upper-Linearizable Optimization with Applications to DR-Submodular Optimization

Abstract

We introduce a novel framework for decentralized projection-free optimization, extending projection-free methods to a broader class of upper-linearizable functions. Our approach leverages decentralized optimization techniques with the flexibility of upper-linearizable function frameworks, effectively generalizing traditional DR-submodular function optimization. We obtain the regret of O(T1-θ/2) with communication complexity of O(Tθ) and number of linear optimization oracle calls of O(T2θ) for decentralized upper-linearizable function optimization, for any 0 θ 1. This approach allows for the first results for monotone up-concave optimization with general convex constraints and non-monotone up-concave optimization with general convex constraints. Further, the above results for first order feedback are extended to zeroth order, semi-bandit, and bandit feedback.