CISUC

Bayes Information Criterion for Tikhonov Problems with Linear Constraints: Application to Radiometric Image Correction

Authors

Subject

Radiometric Camera Calibration

Related Project

C-BASED: A framework for color-based inspection for industrial applications

Conference

Int. Conf. on Image and Signal Processing, August 2002

PDF File


Cited by

Year 2015 : 3 citations

 Image reconstruction of two-dimensional highly scattering inhomogeneous medium using MAP-based estimation
H Qi, Y Qiao, S Sun, Y Yao, L Ruan - Mathematical Problems in …, 2015 - hindawi.com
A maximum a posteriori (MAP) estimation based on Bayesian framework is applied to image
reconstruction of two-dimensional highly scattering inhomogeneous medium. The finite
difference method (FDM) and conjugate gradient (CG) algorithm serve as the forward and ...

 [PDF] MULTI-START CONJUGATE GRADIENT METHOD FOR RETRIEVING THE OPTICAL PARAMETERS IN 2D PARTICIPATING MEDIA WITH FREQUENCY- …
YB Qiao, H Qi, T Jia, LM Ruan, HP Tan - 2015 - researchgate.net
ABSTRACT The optical tomography (OT) based on the frequency-domain equation of
radiative transfer (ERT) is investigated in present research. The frequency-domain ERT is
employed as forward model which is solved by finite volume method (FVM). The ...

 Multi-start iterative reconstruction of the radiative parameter distributions in participating media based on the transient radiative transfer equation
Y Qiao, H Qi, Q Chen, L Ruan, H Tan - Optics Communications, 2015 - Elsevier
Abstract Simultaneous reconstruction of the radiative parameter distributions in participating
media, based on the transient radiative transfer equation (TRTE), was investigated. The
discrete ordinate method was employed to solve the direct TRTE for two-dimensional ...

Year 2013 : 2 citations

 Solving trust-region subproblem augmented with linear inequality constraints
Ø Bergmann, T Steihaug - Optimization Methods and Software, 2013 - Taylor & Franci

 Bergmann, Ørjan, and Trond Steihaug. "Solving trust-region subproblem augmented with linear inequality constraints." Optimization Methods and Software 28.1 (2013): 26-36