Experimental robustness of Fourier Ptychography phase retrieval algorithms
This work addresses robustness issues in computational microscopy for researchers, but it is incremental as it builds on existing algorithms with specific improvements.
The paper tackled the problem of experimental robustness in Fourier ptychography phase retrieval algorithms by comparing multiple inverse algorithms, finding that amplitude-based cost functions outperform intensity-based ones due to better tolerance to noise and model mismatches, and proposed a robust global Newton's method algorithm.
Fourier ptychography is a new computational microscopy technique that provides gigapixel-scale intensity and phase images with both wide field-of-view and high resolution. By capturing a stack of low-resolution images under different illumination angles, a nonlinear inverse algorithm can be used to computationally reconstruct the high-resolution complex field. Here, we compare and classify multiple proposed inverse algorithms in terms of experimental robustness. We find that the main sources of error are noise, aberrations and mis-calibration (i.e. model mis-match). Using simulations and experiments, we demonstrate that the choice of cost function plays a critical role, with amplitude-based cost functions performing better than intensity-based ones. The reason for this is that Fourier ptychography datasets consist of images from both brightfield and darkfield illumination, representing a large range of measured intensities. Both noise (e.g. Poisson noise) and model mis-match errors are shown to scale with intensity. Hence, algorithms that use an appropriate cost function will be more tolerant to both noise and model mis-match. Given these insights, we propose a global Newton's method algorithm which is robust and computationally efficient. Finally, we discuss the impact of procedures for algorithmic correction of aberrations and mis-calibration.