Fiber-preserving and orientation-reversing involutions of Seifert fibered 3-manifolds

Abstract

We consider fiber-preserving, orientation-reversing involutions on orientable Seifert fibered 3-manifolds and the conditions on a manifold for admissibility of such involutions. We construct a class of fiber-preserving, orientation-reversing involutions that act trivially on the base. Each element of is obtained by extending a product involution across Seifert pieces of type V(2,2;-1) - a solid torus with three fibers filled according to Seifert invariants (2,1), (2,1), and (1,-1). We show that forms a single conjugacy class under fiber-preserving diffeomorphisms. Our main result establishes that any fiber-preserving, orientation-reversing involution factors as g, where g is fiber-preserving and orientation-preserving and ∈, thus reducing the problem to the previously known orientation-preserving case. Through the orientable base-space double covering, we further extend the classification to manifolds with non-orientable base orbifold.