Online Self-Concordant and Relatively Smooth Minimization, With Applications to Online Portfolio Selection and Learning Quantum States
Tsai, Chung-En, Cheng, Hao-Chung, Li, Yen-Huan
Consider an online convex optimization problem where the loss functions are self-concordant barriers, smooth relative to a convex function $h$, and possibly non-Lipschitz. We analyze the regret of online mirror descent with $h$. Then, based on the result, we prove the following in a unified manner. Denote by $T$ the time horizon and $d$ the parameter dimension. 1. For online portfolio selection, the regret of $\widetilde{\text{EG}}$, a variant of exponentiated gradient due to Helmbold et al., is $\tilde{O} ( T^{2/3} d^{1/3} )$ when $T > 4 d / \log d$. This improves on the original $\tilde{O} ( T^{3/4} d^{1/2} )$ regret bound for $\widetilde{\text{EG}}$. 2. For online portfolio selection, the regret of online mirror descent with the logarithmic barrier is $\tilde{O}(\sqrt{T d})$. The regret bound is the same as that of Soft-Bayes due to Orseau et al. up to logarithmic terms. 3. For online learning quantum states with the logarithmic loss, the regret of online mirror descent with the log-determinant function is also $\tilde{O} ( \sqrt{T d} )$. Its per-iteration time is shorter than all existing algorithms we know.
Sep-21-2023
- Country:
- North America > United States
- Pennsylvania > Philadelphia County
- Philadelphia (0.04)
- New York > New York County
- New York City (0.04)
- Pennsylvania > Philadelphia County
- Europe > United Kingdom
- England > Cambridgeshire > Cambridge (0.04)
- Asia > Taiwan
- Taiwan Province > Taipei (0.04)
- North America > United States
- Genre:
- Research Report (0.64)
- Industry:
- Education (0.36)
- Technology: