Alternating and Symmetric Separability of Free Products
Abstract
Let F G be a free product of a free group F and a LERF group G. In this note, we provide sufficient conditions for a subgroup H of F G to be A S-separable, that is, for any finite set \γ1, …, γn\ ⊂ (F G) H, there is a surjection f from F G to an alternating or symmetric group such that f(γi) f(H) for all i. As a corollary, any finitely generated infinite-index subgroup of a free group is A S-separable in the free product of the free group and an arbitrary LERF group, generalizing a result of Wilton.
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