Title :
MAP signal estimation in noisy sequences of morphologically smooth images
Author :
Sidiropoulos, N.D. ; Meleas, D. ; Stragas, T.
Author_Institution :
Inst. for Syst. Res., Maryland Univ., College Park, MD, USA
fDate :
6/1/1996 12:00:00 AM
Abstract :
Sidiropoulos et al. (1994) demonstrated that morphological openings and closings can be viewed as maximum a posteriori (MAP) estimators of morphologically smooth signals in signal-independent i.i.d. noise. The present authors extend these results to the M-fold independent observation case, and show that the aforementioned estimators are strongly consistent. We also demonstrate the validity of a thresholding conjecture (Sidiropoulos et al., 1994) by simulation, and use it to evaluate estimator performance. Taken together, these results can help determine the least upper bound, M¯, on M, which guarantees virtually error-free reconstruction of morphologically smooth images
Keywords :
image reconstruction; image sequences; mathematical morphology; maximum likelihood estimation; optical noise; smoothing methods; M-fold independent observation case; MAP signal estimation; estimator performance; least upper bound; maximum a posteriori estimators; morphological closings; morphological openings; morphologically smooth images; noisy sequences; signal-independent i.i.d. noise; thresholding conjecture; virtually error-free reconstruction; Collaboration; Estimation; Extraterrestrial measurements; Filtering theory; Filters; Image reconstruction; Lattices; Morphology; Random variables; Upper bound;
Journal_Title :
Image Processing, IEEE Transactions on
