Property G and the 4--genus
Abstract
We say a null-homologous knot K in a 3--manifold Y has Property G, if the properties about the Thurston norm and fiberedness of the complement of K is preserved under the zero surgery on K. In this paper, we will show that, if the smooth 4--genus of K×\0\ (in a certain homology class) in (Y×[0,1])\#N CP2, where Y is a rational homology sphere, is smaller than the Seifert genus of K, then K has Property G. When the smooth 4--genus is 0, Y can be taken to be any closed, oriented 3--manifold.
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