The Dvoretzky-Hanani theorem for the group ``\(ax+b\)'' (Q1276293)

The authors consider the group \(G\) of affine transformations of the line. They show that given a sequence \((g_k)^\infty_{k=1}\) converging to 1 in \(G\) there is a sequence of signs \(\varepsilon_k=\pm 1\) such that the infinite product \(\Pi^\infty_{k=1} g^{\varepsilon_k}_k\) is convergent.