Probability Distributions of Positioning Errors for Some Forms of Center-of-Gravity Algorithms

The center of gravity is a widespread algorithm for position reconstruction in particle physics. For track fitting, its standard use is always accompanied by an easy guess for the probability distribution of the positioning errors. This is an incorrect assumption that degrades the results of the fit. The explicit error forms show evident Cauchy-(Agnesi) tails that render problematic the use of variance minimizations. Here, we report the probability distributions for some combinations of random variables, impossible to find in literature, but essential for track fitting: $x={\xi}/{(\xi+\eta)}$, $y={(\xi-\eta)}/[2{(\xi+\eta)}]$, $w=\xi/\eta$, $x=\theta(x_3-x_1) (-x_3)/(x_3+x_2) +\theta(x_1-x_3)x_1/(x_1+x_2)$ and $x=(x_1-x_3)/(x_1+x_2+x_3)$. The first three are directly connected to each other and are partial forms of the two-strip center of gravity. The fourth is the complete two-strip center of gravity. For its very complex form, it allows only approximate expressions of the probability. The last expression is a simplified form of the three-strip center of gravity. General integral forms are obtained for all of them. Detailed analytical expressions are calculated assuming $\xi$, $\eta$, $x_1$, $x_2$ and $x_3$ independent random variables with Gaussian probability distributions (the standard assumption for the strip noise).