TY - GEN
T1 - Theoretical analysis of diffraction imaging in Fourier ptychography microscopy
AU - Zhang, Shaohui
AU - Hu, Yao
AU - Wang, Ying
AU - Cheng, Xuemin
AU - Hao, Qun
N1 - Publisher Copyright:
© COPYRIGHT SPIE. Downloading of the abstract is permitted for personal use only.
PY - 2019
Y1 - 2019
N2 - Fourier ptychography microscopy (FPM) is a recently developed computational imaging approach which surpasses the resolution barrier of a low numerical aperture (NA) imaging system. It is a powerful tool due to its ability to achieve super resolution of complex sample function, pupil aberration, LED misalignment, and beyond. However, recent studies have focused more on the optimization algorithms and set-ups instead of its theoretical background. Although some imaging laws about FPM have already been set forth, the formulas and laws are not fully defined, and the connection between diffraction theory and Fourier optics has a gap. Therefore, there exist a need for comprehensive research on physical and mathematical basis of FPM for future applications. Keeping this goal in mind, this manuscript utilizes scalar field diffraction theory to rigorously study the relationship between wavelength, the propagation mode, illumination direction of the incident wave, sample structure information and the direction of the output wave. The theoretical analysis of diffraction imaging in FPM provides a clear physical basis for not only the FPM systems, but also for the ptychography iterative engine (PIE) and any other coherent diffraction imaging techniques and systems. It can help to find the source of noise and therefore improve image quality in FPM technique and systems.
AB - Fourier ptychography microscopy (FPM) is a recently developed computational imaging approach which surpasses the resolution barrier of a low numerical aperture (NA) imaging system. It is a powerful tool due to its ability to achieve super resolution of complex sample function, pupil aberration, LED misalignment, and beyond. However, recent studies have focused more on the optimization algorithms and set-ups instead of its theoretical background. Although some imaging laws about FPM have already been set forth, the formulas and laws are not fully defined, and the connection between diffraction theory and Fourier optics has a gap. Therefore, there exist a need for comprehensive research on physical and mathematical basis of FPM for future applications. Keeping this goal in mind, this manuscript utilizes scalar field diffraction theory to rigorously study the relationship between wavelength, the propagation mode, illumination direction of the incident wave, sample structure information and the direction of the output wave. The theoretical analysis of diffraction imaging in FPM provides a clear physical basis for not only the FPM systems, but also for the ptychography iterative engine (PIE) and any other coherent diffraction imaging techniques and systems. It can help to find the source of noise and therefore improve image quality in FPM technique and systems.
KW - Diffraction theory
KW - Fourier ptychography
KW - Phase retrieval
KW - Wavelength multiplex
UR - http://www.scopus.com/inward/record.url?scp=85072640692&partnerID=8YFLogxK
U2 - 10.1117/12.2519587
DO - 10.1117/12.2519587
M3 - Conference contribution
AN - SCOPUS:85072640692
T3 - Proceedings of SPIE - The International Society for Optical Engineering
BT - Computational Imaging IV
A2 - Mahalanobis, Abhijit
A2 - Tian, Lei
A2 - Petruccelli, Jonathan C.
PB - SPIE
T2 - Computational Imaging IV 2019
Y2 - 14 April 2019 through 15 April 2019
ER -