This paper considers two-object resolution from the viewpoint of model fitt
ing theory. The studied experiment consists in counting events, for example
, an electron hitting a detector pixel. It is stated that the precision and
the accuracy with which the locations of the objects can be estimated will
determine the attainable resolution. Two different approaches are followed
. For both, the special case of Gaussian peaks is further investigated. The
first approach leads to the maximally attainable precision. It is shown th
at this precision is determined by a certain factor, which is a function of
the distance of the peaks, their widths and the number of counts. This fac
tor will be called the resolution factor. The influence of each of the quan
tities involved is determined by the way they enter this factor. The second
approach defines a probability of resolution, i.e., the probability that t
he maximum likelihood estimates of the locations will be distinct. It is sh
own that the resolution factor, which resulted from the first approach, als
o determines the probability of resolution. (C) 1999 Elsevier Science B.V.
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