Abstract :
An estimator for estimating the parameters of a Markov random field X from inaccurate observations is introduced. The author considers first a Markov (Gibbs) random field X={Xi,j} on a lattice L={(i ,j): i=1,2,. . .,n; j=1,2,. . .,m}. The marginal distributions of (Xi,j, Xi+u,j+v) (u,v=-1,0,1) are first estimated from an image. Then, random fields X* are simulated with the probability of X*i+u,j+v)=b nearly equal to the estimate of P{Xi,j=X i+u,=b}. A simulation method similar to the Gibbs sampler is used. The parameters of the Markov random field model are estimated from the X*´s with the pseudolikelihood method
Keywords :
Markov processes; parameter estimation; picture processing; probability; Gibbs sampler; hidden Markov random fields; parameter estimation; picture processing; probability; pseudolikelihood method; simulation-based estimator; Analytical models; Frequency estimation; Hidden Markov models; Image analysis; Image restoration; Lattices; Layout; Markov random fields; Parameter estimation; Probability;
