We say that a subset $X$ quasi-isometrically boundedly generates a finitely generated group $Gamma$ if each element $gamma$ of a finite-index subgroup of $Gamma$ can be written as a product $gamma = x_1 x_2 cdots x_r$ of a bounded number of elements of $X$, such that the word length of each $x_i$ is bounded by a constant times the word length of $gamma$. A. Lubotzky, S. Mozes, and M.S. Raghunathan observed in 1993 that ${rm SL}(n,{mathbb Z})$ is quasi-isometrically boundedly generated by the elements of its natural ${rm SL}(2,{mathbb Z})$ subgroups. We generalize (a slightly weakened version of) this by showing that every $S$-arithmetic subgroup of an isotropic, almost-simple ${mathbb Q}$-group is quasi-isometrically boundedly generated by standard ${mathbb Q}$-rank-1 subgroups.
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