Gradients of sequences of subgroups in a direct product
Abstract
For a sequence \Un\n = 1∞ of finite index subgroups of a direct product G = A × B of finitely generated groups, we show that n ∞ \|X| : X = Un\[G : Un] = 0 once [A : A Un], [B : B Un] ∞ as n ∞. Our proof relies on the classification of finite simple groups. For A,B that are finitely presented we show that n ∞ |Torsion(Unab)|[G : Un] = 0.
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