Every non-trivial knot group is fully residually perfect

Abstract

Given a class P of groups we say that a group G is fully residually P if for any finite subset F of G, there exists an epimorphism from G to a group in P which is injective on F. It is known that any non-trivial knot group is fully residually finite. For hyperbolic knots, its knot group is fully residually closed hyperbolic 3--manifold group, and fully residually simple. In this article, we show that every non-trivial knot group is fully residually perfect, closed 3--manifold group.

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