Parameter-free Algorithms for the Stochastically Extended Adversarial Model
Abstract
We develop the first parameter-free algorithms for the Stochastically Extended Adversarial (SEA) model, a framework that bridges adversarial and stochastic online convex optimization. Existing approaches for the SEA model require prior knowledge of problem-specific parameters, such as the diameter of the domain D and the Lipschitz constant of the loss functions G, which limits their practical applicability. Addressing this, we develop parameter-free methods by leveraging the Optimistic Online Newton Step (OONS) algorithm to eliminate the need for these parameters. We first establish a comparator-adaptive algorithm for the scenario with unknown domain diameter but known Lipschitz constant, achieving an expected regret bound of O(\|u\|22 + \|u\|2(σ21:T + 21:T)), where u is the comparator vector and σ21:T and 21:T represent the cumulative stochastic variance and cumulative adversarial variation, respectively. We then extend this to the more general setting where both D and G are unknown, attaining the comparator- and Lipschitz-adaptive algorithm. Notably, the regret bound exhibits the same dependence on σ21:T and 21:T, demonstrating the efficacy of our proposed methods even when both parameters are unknown in the SEA model.
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