Knots and non-orientable surfaces in 3-manifolds
Abstract
In this article, we propose a new approach for describing and understanding knots and links in a 3-manifold through the use of an embedded non-orientable surface. Specifically, we define a plat-like representation based on this non-orientable surface. The method applies to manifolds of the form M= H C(U) where H is a handlebody, C(U) is the mapping cylinder of the orientating two sheeted covering of a non-orientable closed surface U and :∂ H ∂ C(U) is an attaching homeomorphism. We show that, by fixing such a splitting any link in the manifold can be represented as a plat-like closure of an element of the surface braid group of ∂ H. Manifolds of this type were extensively studied by J.H. Rubinstein rubinstein1978one, where it is shown that any 3-manifold M, with a non-vanishing H2(M,Z2Z) will admit such a splitting. Thus the method is quite general. We provide explicit examples of such embeddings in lens spaces L(2k,q) and the trivial circle bundles over orientable closed surfaces, × S1
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