Bilevel methods for image reconstruction

TL;DR

This paper reviews bilevel optimization methods for image reconstruction, highlighting their role in learning regularization parameters and filters from training data, and discusses various optimization approaches and applications.

Contribution

It provides a comprehensive overview of bilevel methods in image reconstruction, including perspectives, optimization techniques, and practical applications, making the topic accessible to diverse audiences.

Findings

Bilevel methods effectively learn regularization parameters from data.

Various optimization strategies for bilevel problems are analyzed.

Applications include filter learning and hyperparameter tuning in image reconstruction.

Abstract

This review discusses methods for learning parameters for image reconstruction problems using bilevel formulations. Image reconstruction typically involves optimizing a cost function to recover a vector of unknown variables that agrees with collected measurements and prior assumptions. State-of-the-art image reconstruction methods learn these prior assumptions from training data using various machine learning techniques, such as bilevel methods. One can view the bilevel problem as formalizing hyperparameter optimization, as bridging machine learning and cost function based optimization methods, or as a method to learn variables best suited to a specific task. More formally, bilevel problems attempt to minimize an upper-level loss function, where variables in the upper-level loss function are themselves minimizers of a lower-level cost function. This review contains a running example problem of learning tuning parameters and the coefficients for sparsifying filters used in a regularizer. Such filters generalize the popular total variation regularization method, and learned filters are closely related to convolutional neural networks approaches that are rapidly gaining in popularity. Here, the lower-level problem is to reconstruct an image using a regularizer with learned sparsifying filters; the corresponding upper-level optimization problem involves a measure of reconstructed image quality based on training data. This review discusses multiple perspectives to motivate the use of bilevel methods and to make them more easily accessible to different audiences. We then turn to ways to optimize the bilevel problem, providing pros and cons of the variety of proposed approaches. Finally we overview bilevel applications in image reconstruction.