An EM approach to mineral analysis using natural gamma rays
Digital Signal Processing
| Hi-index | 754.84 |
This correspondence examines the Cramer-Rao (CR) bound for data obtained in emission tomography. The likelihood function involved is the combined probability of independent Poisson random variables, the expectation of each being a linear function ciTλ of the parameter vector λ. We investigated the achievability of the CR bound in the interior and on the boundary of the domain of the problem. For the former, we found that the CR bound is achievable if and only if the ci vectors are obtained from a basis for RN, by repeating some vectors, multiplied by constant factors. A similar result holds for the boundary case. The practical implication of the achievability condition is that the CR bound is not attainable for typical emission tomographic systems