A. Kirtadze
Abstract:
For invariant (quasi-invariant) $\sigma$-finite measures on an uncountable group
$(G,\cdot)$, the behaviour of small sets with respect to the operation "$\cdot$"
is studied. Some classes of non-commutative groups $(G,\cdot)$ are discussed
especially, by using a representation of the original group in the form of a
direct product of its two subgroups, one of which is commutative.
Keywords:
Non-commutative group, quasi-invariant measure, measure zero set, direct product
of groups, negligible set, absolutely negligible set.
MSC 2000: 28A05, 28D05