#### Publication Date

1-2012

#### Abstract

Traditional statistical estimates S(x_{1}, ..., x_{n}) for different statistical characteristics S (such as mean, variance, etc.) implicitly assume that we know the sample values x_{1}, ..., x_{n} exactly. In practice, the sample values Xi come from measurements and are, therefore, in general, different from the actual (unknown) values x_{i} of the corresponding quantities. Sometimes, we know the probabilities of different values of the measurement error d_{i} = X_{i} - x_{i}, but often, the only information that we have about the measurement error is the upper bound D_{i} on its absolute value -- provided by the manufacturer of the corresponding measuring instrument. In this case, the only information that we have about the actual values x_{i} is that they belong to the intervals [x_{i}] = [X_{i} - D_{i}, X_{i} + D_{i}].

In general, different values xi from the intervals [x_{i}] lead to different values of the corresponding estimate S(x_{i}, ..., x_{i}). In this case, it is desirable to find the range of all possible values of this characteristic.

In this paper, we consider the problem of computing the corresponding range for the cases of lognormal and delta-lognormal distributions. Interestingly, it turns out that, in contrast to the case of normal distribution for which it is feasible to compute the range of the mean, for lognormal and delta-lognormal distributions, computing the range of the mean is an NP-hard problem.

## Comments

Technical Report: UTEP-CS-12-02