z-logo
open-access-imgOpen Access
Fourier transform‐based windowed adaptive switching minimum filter for reducing periodic noise from digital images
Author(s) -
Varghese Justin,
Subash Saudia,
Tairan Nasser
Publication year - 2016
Publication title -
iet image processing
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.401
H-Index - 45
eISSN - 1751-9667
pISSN - 1751-9659
DOI - 10.1049/iet-ipr.2015.0750
Subject(s) - frequency domain , noise (video) , computer science , image noise , filter (signal processing) , artificial intelligence , computer vision , dark frame subtraction , fourier transform , mathematics , discrete fourier transform (general) , algorithm , binary image , gradient noise , noise reduction , noise measurement , image restoration , image (mathematics) , short time fourier transform , fourier analysis , image processing , noise floor , mathematical analysis
This paper presents a windowed adaptive switching minimum filter in frequency domain to restore images corrupted by periodic noise. Periodic noise frequencies that spread throughout the spatial domain image concentrate in frequency domain image as star‐shaped peak regions. The proposed algorithm incorporates distinct stages of noisy frequency detection and correction. The noisy frequency detection stage has peak detection and noise map generation sub‐stages to effectively identify noisy peak areas into a binary flag image from the directional image of the origin shifted Fourier transformed corrupted image. The proposed noise correction scheme restores the detected noisy areas of the corrupted frequency domain image with the minimum of nearest possible uncorrupted frequencies. Finally, inverse shifting and inverse Fourier transform operations generates the restored image. Experimental results in terms of subjective and objective metrics demarcate that the proposed periodic noise reduction filter is more effective in restoring images corrupted with periodic noise than other filters used in the comparative study.

The content you want is available to Zendy users.

Already have an account? Click here to sign in.
Having issues? You can contact us here