The Cramer-Rao inequality to go beyond the N-limit of the standard least-squares method in track fitting

Abstract

The Cramer-Rao-Frechet inequality is reviewed specializing it to track fitting. A diffused opinion attributes to this inequality the limitation of the resolution of the track fits with the number N of observations. It turns out that this opinion is incorrect, weighted least squares method is not subjected to that N-limitation. In a previous publication, simulations with a simple Gaussian model produced interesting results: a linear growth of the peaks of the distributions with the number N of observations, much faster than the N of the standard least squares. These results could be considered a violation of a well known 1/N-rule for the variance of an unbiased estimator, frequently reported as the Cramer-Rao-Frechet bound. To clarify this point beyond any doubt, it would be essential a direct proof of the consistency of those results with this inequality. Unfortunately, such proof is lacking or very difficult to find. Hence, the Cramer-Rao-Frechet developments are applied to prove the efficiency (optimality) of the simple Gaussian model and the consistency of its results. The inequality remains valid even for irregular models supporting the results of realistic models with similar growths.