Add to ORKGAbstract. Silver and Whitten proved that every knot in S3 is in-vertibly concordant to a hyperbolic knot by a series of Nakanishi’s construction. We prove that every knot in S3 is invertibly concor-dant to a nonhyperbolic prime knot by a simple one step satellite construction. 1
The main subject of this thesis is the study of the equivariant concordance group of directed strong...
Given a 3–manifold Y and a free homotopy class in [S1, Y ], we investigate the set of topological c...
At the opening of the conference, our host, Hitoshi Murakami, charged the participants to consider t...
This paper employs the theory of tangles to show that every knot in the 3-sphere is concordant to a ...
Abstract. Let P be a knot in a solid torus, K a knot in S3 and P (K) the satellite knot of K with pa...
Given a 3–manifold Y and a free homotopy class in [S 1 , Y ], we investigate the set of topological ...
Knots and links play an important role in 3-manifolds and the equiva- lence relation of concordance ...
Knots and links play an important role in 3-manifolds and the equiva- lence relation of concordance ...
Abstract. Any knot in a solid torus (called a satellite operator) acts on knots in S3. We introduce ...
Given a 3-manifold Y and a free homotopy class in [S-1, Y], we investigate the set of topological co...
Abstract. Let P be a knot in an unknotted solid torus (i.e. a satellite operator or pattern), K a kn...
Davis showed that the topological concordance class of a link in the 3-sphere is uniquely determined...
AbstractThe twisted Alexander polynomial of a knot is applied in three areas of knot theory: inverti...
Abstract. We show that if K is a satellite knot in the 3-sphere S3 which admits a generalized cosmet...
This thesis is centered on Sakuma's paper "On strongly invertible knots" (Alg. and TOp. Theories, 19...
The main subject of this thesis is the study of the equivariant concordance group of directed strong...
Given a 3–manifold Y and a free homotopy class in [S1, Y ], we investigate the set of topological c...
At the opening of the conference, our host, Hitoshi Murakami, charged the participants to consider t...
This paper employs the theory of tangles to show that every knot in the 3-sphere is concordant to a ...
Abstract. Let P be a knot in a solid torus, K a knot in S3 and P (K) the satellite knot of K with pa...
Given a 3–manifold Y and a free homotopy class in [S 1 , Y ], we investigate the set of topological ...
Knots and links play an important role in 3-manifolds and the equiva- lence relation of concordance ...
Knots and links play an important role in 3-manifolds and the equiva- lence relation of concordance ...
Abstract. Any knot in a solid torus (called a satellite operator) acts on knots in S3. We introduce ...
Given a 3-manifold Y and a free homotopy class in [S-1, Y], we investigate the set of topological co...
Abstract. Let P be a knot in an unknotted solid torus (i.e. a satellite operator or pattern), K a kn...
Davis showed that the topological concordance class of a link in the 3-sphere is uniquely determined...
AbstractThe twisted Alexander polynomial of a knot is applied in three areas of knot theory: inverti...
Abstract. We show that if K is a satellite knot in the 3-sphere S3 which admits a generalized cosmet...
This thesis is centered on Sakuma's paper "On strongly invertible knots" (Alg. and TOp. Theories, 19...
The main subject of this thesis is the study of the equivariant concordance group of directed strong...
Given a 3–manifold Y and a free homotopy class in [S1, Y ], we investigate the set of topological c...
At the opening of the conference, our host, Hitoshi Murakami, charged the participants to consider t...
