The Virtually Fibered Conjecture is a conjecture in the field of geometric topology, particularly concerning 3-manifolds. It posits that every aspherical closed irreducible 3-manifold that is not a torus or a connected sum of tori is "virtually fibered." To explain further: - A **3-manifold** is a three-dimensional topological space that locally looks like Euclidean 3-dimensional space.
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