Abstract
AbstractThe following question is proposed by Martino, Tointon, Valiunas and Ventura in [4, question 1·20]:Let G be a compact group, and suppose that \[\mathcal{N}_k(G) = \{(x_1,\dots,x_{k+1}) \in G^{k+1} \;|\; [x_1,\dots, x_{k+1}] = 1\}\] has positive Haar measure in $G^{k+1}$ . Does G have an open k-step nilpotent subgroup?We give a positive answer for $k = 2$ .
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