Title :
Inversion of large-support ill-conditioned linear operators using a Markov model with a line process
Author :
Nikolova, Mila ; Mohammad-djafari, Ali ; Idier, Jérôme
Author_Institution :
Lab. des Signaux et Syst., Ecole Superieure d´´Electr., Gif-sur-Yvette, France
Abstract :
We propose a method for the reconstruction of an image, only partially observed through a linear integral operator. As such an inverse problem is ill-posed, prior information must be introduced. We consider the case of a compound Markov random field with a non-interacting line process. In order to maximise the posterior likelihood function, we propose an extension of the graduated non convexity principle pioneered by Blake and Zisserman (1987) which allows its use for ill-posed linear inverse problems. We discuss the role of the observation scale and some aspects of the implemented algorithm. Finally, we present an application of the method to a diffraction tomography imaging problem
Keywords :
Markov processes; image reconstruction; integral equations; inverse problems; tomography; Markov model; compound Markov random field; diffraction tomography imaging problem; graduated nonconvexity principle; image reconstruction; implemented algorithm; integral operator; inverse problem; inversion; large-support ill-conditioned linear operators; line process; observation scale; posterior likelihood function; Convolution; Crystallography; Diffraction; Fourier transforms; Image reconstruction; Inverse problems; Markov random fields; Microwave integrated circuits; Radio interferometry; Tomography;
Conference_Titel :
Acoustics, Speech, and Signal Processing, 1994. ICASSP-94., 1994 IEEE International Conference on
Conference_Location :
Adelaide, SA
Print_ISBN :
0-7803-1775-0
DOI :
10.1109/ICASSP.1994.389414
