Abstract
There are considered discontinuous motion groups — in a very weak sense — of a pseudoeuclidean plane. A motion groupG is to be said (8′)-discrete, if there can be found a nontrivial orbit G(P) and a Minkovskian circle diskUτ which contains only a finite number of elements of G(P). Such groups will be divided after their subgroup of translations, necessary and sufficient conditions for the translations will be given as same as — to a certain extent — a classification of (8′)-discrete groups.
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