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Meta-Learning with a Geometry-Adaptive Preconditioner

Computer Vision and Pattern Recognition 2023-11-30 v2 Artificial Intelligence Machine Learning

Abstract

Model-agnostic meta-learning (MAML) is one of the most successful meta-learning algorithms. It has a bi-level optimization structure where the outer-loop process learns a shared initialization and the inner-loop process optimizes task-specific weights. Although MAML relies on the standard gradient descent in the inner-loop, recent studies have shown that controlling the inner-loop's gradient descent with a meta-learned preconditioner can be beneficial. Existing preconditioners, however, cannot simultaneously adapt in a task-specific and path-dependent way. Additionally, they do not satisfy the Riemannian metric condition, which can enable the steepest descent learning with preconditioned gradient. In this study, we propose Geometry-Adaptive Preconditioned gradient descent (GAP) that can overcome the limitations in MAML; GAP can efficiently meta-learn a preconditioner that is dependent on task-specific parameters, and its preconditioner can be shown to be a Riemannian metric. Thanks to the two properties, the geometry-adaptive preconditioner is effective for improving the inner-loop optimization. Experiment results show that GAP outperforms the state-of-the-art MAML family and preconditioned gradient descent-MAML (PGD-MAML) family in a variety of few-shot learning tasks. Code is available at: https://github.com/Suhyun777/CVPR23-GAP.

Keywords

Cite

@article{arxiv.2304.01552,
  title  = {Meta-Learning with a Geometry-Adaptive Preconditioner},
  author = {Suhyun Kang and Duhun Hwang and Moonjung Eo and Taesup Kim and Wonjong Rhee},
  journal= {arXiv preprint arXiv:2304.01552},
  year   = {2023}
}

Comments

Accepted at CVPR 2023. Code is available at: https://github.com/Suhyun777/CVPR23-GAP; This is an extended version of our previous CVPR23 work

R2 v1 2026-06-28T09:48:23.327Z