Litcius/Paper detail

Learning Weakly Convex Regularizers for Convergent Image-Reconstruction Algorithms

Alexis Goujon, Sebastian Neumayer, Michaël Unser

2024SIAM Journal on Imaging Sciences28 citationsDOIOpen Access PDF

Abstract

We propose to learn non-convex regularizers with a prescribed upper bound on their weak-convexity modulus. Such regularizers give rise to variational denoisers that minimize a convex energy. They rely on few parameters (less than 15,000) and offer a signal-processing interpretation as they mimic handcrafted sparsity-promoting regularizers. Through numerical experiments, we show that such denoisers outperform convex-regularization methods as well as the popular BM3D denoiser. Additionally, the learned regularizer can be deployed to solve inverse problems with iterative schemes that provably converge. For both CT and MRI reconstruction, the regularizer generalizes well and offers an excellent tradeoff between performance, number of parameters, guarantees, and interpretability when compared to other data-driven approaches.

Topics & Concepts

Regular polygonImage (mathematics)Artificial intelligenceAlgorithmMathematicsImage processingIterative reconstructionComputer visionComputer scienceMathematical optimizationGeometrySparse and Compressive Sensing TechniquesMedical Image Segmentation TechniquesPhotoacoustic and Ultrasonic Imaging
Learning Weakly Convex Regularizers for Convergent Image-Reconstruction Algorithms | Litcius