Enhancing and Accelerating Diffusion-Based Inverse Problem Solving through Measurements Optimization

TL;DR

This paper introduces a measurement optimization module that significantly accelerates diffusion-based inverse problem solving, achieving state-of-the-art results with fewer function evaluations across diverse tasks.

Contribution

The paper presents a plug-and-play measurement optimization method that enhances diffusion models' efficiency and performance in inverse problems, requiring fewer NFEs.

Findings

Operates with no more than 100 NFEs in most tasks

Achieves SOTA or near-SOTA results at low NFE counts

Seamlessly integrates into existing diffusion-based solutions

Abstract

Diffusion models have recently demonstrated notable success in solving inverse problems. However, current diffusion model-based solutions typically require a large number of function evaluations (NFEs) to generate high-quality images conditioned on measurements, as they incorporate only limited information at each step. To accelerate the diffusion-based inverse problem-solving process, we introduce \textbf{M}easurements \textbf{O}ptimization (MO), a more efficient plug-and-play module for integrating measurement information at each step of the inverse problem-solving process. This method is comprehensively evaluated across eight diverse linear and nonlinear tasks on the FFHQ and ImageNet datasets. By using MO, we establish state-of-the-art (SOTA) performance across multiple tasks, with key advantages: (1) it operates with no more than 100 NFEs, with phase retrieval on ImageNet being the sole exception; (2) it achieves SOTA or near-SOTA results even at low NFE counts; and (3) it can be seamlessly integrated into existing diffusion model-based solutions for inverse problems, such as DPS \cite{chung2022diffusion} and Red-diff \cite{mardani2023variational}. For example, DPS-MO attains a peak signal-to-noise ratio (PSNR) of 28.71 dB on the FFHQ 256 dataset for high dynamic range imaging, setting a new SOTA benchmark with only 100 NFEs, whereas current methods require between 1000 and 4000 NFEs for comparable performance.