Add to ORKGABSTRACT. We give a simple sufficient condition for a spun-normal surface in an ideal triangulation to be incompressible, namely that it is a vertex surface with non-empty boundary which has a quadrilateral in each tetrahedron. While this condition is far from being necessary, it is powerful enough to give two new results: the existence of alternating knots with non-integer boundary slopes, and a proof of the Slope Conjecture for a large class of 2-fusion knots. While the condition and conclusion are purely topological, the proof uses the Culler-Shalen theory of essential surfaces arising from ideal points of the character variety, as reinterpreted by Thurston and Yoshida. The criterion itself comes from the work of Kabaya, which we place i...
AbstractAny two triangulations of a closed surface with the same number of vertices can be transform...
Following Matveev, a k-normal surface in a triangulated 3-manifold is a generalization of both norma...
Seiya Negami showed that any two triangulations of a closed surface with the same number of vertices...
Abstract In this paper, we will compute the dimension of the space of spun and ordinary normal surfa...
Abstract. A major breakthrough in the theory of topological algorithms occurred in 1992 when Hyam Ru...
Abstract. Let L be a non-split, prime and alternating link in the 3-sphere S3, and S an incompressib...
Normal surfaces are a way to represent embedded surfaces in triangulated 3-manifolds using vectors. ...
AbstractNormal surface theory is used to study Dehn fillings of a knot-manifold. We use that any tri...
AbstractWe prove that the complements of all knots and links in S3 which have a 2n-plat projection w...
Normal surfaces are a ubiquitous tool in computational 3-manifold theory. In this paper, we investig...
Abstract. In this paper we show that given a knot or link K in a 2n-plat projection with n 3 and m ...
Ph.D.MathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue....
We extend normal surface Q-theory developed in compact triangulated 3-manifolds to some non-compact ...
"In this note, we introduce the notions of frozen triangulations on closed surfaces, as ones to whic...
We consider triangulations of closed surfaces S with a given set of vertices V ; every triangulation...
AbstractAny two triangulations of a closed surface with the same number of vertices can be transform...
Following Matveev, a k-normal surface in a triangulated 3-manifold is a generalization of both norma...
Seiya Negami showed that any two triangulations of a closed surface with the same number of vertices...
Abstract In this paper, we will compute the dimension of the space of spun and ordinary normal surfa...
Abstract. A major breakthrough in the theory of topological algorithms occurred in 1992 when Hyam Ru...
Abstract. Let L be a non-split, prime and alternating link in the 3-sphere S3, and S an incompressib...
Normal surfaces are a way to represent embedded surfaces in triangulated 3-manifolds using vectors. ...
AbstractNormal surface theory is used to study Dehn fillings of a knot-manifold. We use that any tri...
AbstractWe prove that the complements of all knots and links in S3 which have a 2n-plat projection w...
Normal surfaces are a ubiquitous tool in computational 3-manifold theory. In this paper, we investig...
Abstract. In this paper we show that given a knot or link K in a 2n-plat projection with n 3 and m ...
Ph.D.MathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue....
We extend normal surface Q-theory developed in compact triangulated 3-manifolds to some non-compact ...
"In this note, we introduce the notions of frozen triangulations on closed surfaces, as ones to whic...
We consider triangulations of closed surfaces S with a given set of vertices V ; every triangulation...
AbstractAny two triangulations of a closed surface with the same number of vertices can be transform...
Following Matveev, a k-normal surface in a triangulated 3-manifold is a generalization of both norma...
Seiya Negami showed that any two triangulations of a closed surface with the same number of vertices...