Best-of-three-worlds Analysis for Linear Bandits with Follow-the-regularized-leader Algorithm

The linear bandit problem has been studied for many years in both stochastic and adversarial settings. Designing an algorithm that can optimize the environment without knowing the loss type attracts lots of interest. \citet{LeeLWZ021} propose an algorithm that actively detects the loss type and then switches between different algorithms specially designed for different settings. However, such an approach requires meticulous designs to perform well in all settings. Follow-the-regularized-leader (FTRL) is another popular algorithm type that can adapt to different environments. This algorithm is of simple design and the regret bounds are shown to be optimal in traditional multi-armed bandit problems compared with the detect-switch type algorithms. Designing an FTRL-type algorithm for linear bandits is an important question that has been open for a long time. In this paper, we prove that the FTRL-type algorithm with a negative entropy regularizer can achieve the best-of-three-world results for the linear bandit problem with the tacit cooperation between the choice of the learning rate and the specially designed self-bounding inequality.