On groups with weak Sierpi\'nski subsets
Abstract
In a group G, a weak Sierpi\'nski subset is a subset E such that for some g,h∈ G and a≠ b∈ E, we have gE=E \a\ and hE=E \b\. In this setting, we study the subgroup generated by g and h, and show that it has a special presentation, namely of the form Gk= g,h (h-1g)k unless it is free over (g,h). In addition, in such groups Gk, we characterize all weak Sierpi\'nski subsets.
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