Add to ORKGIn the present paper, we characterize the knot types of composite knots in the 3-sphere S3 with 1-bridge genus two. 1
A knot is a smooth embedding of the unit sphere S1 into R3.Two knots are said to be equivalent if th...
We analyze the two variable series invariant for knot complements originating from a categorificatio...
We analyze the two variable series invariant for knot complements originating from a categorificatio...
AbstractIn this paper, we characterize closed incompressible surfaces of genus two in the complement...
We say a knot k in the 3-sphere S-3 has Property I E if the infinite cyclic cover of the knot exteri...
AbstractA Heegaard splitting for S3 gives a 1-bridge presentation for a knot k⊂S3 if the knot inters...
In this paper we show that all 3-manifolds of a family introduced by M. J. Dunwoody are cyclic cover...
AbstractWe say a knot k in the 3-sphere S3 has Property IE if the infinite cyclic cover of the knot ...
In this paper we show that all 3-manifolds of a family introduced by M. J. Dunwoody are cyclic cover...
grantor: University of TorontoA well known family of knots is the torus knots. These are t...
grantor: University of TorontoA well known family of knots is the torus knots. These are t...
Abstract. In this paper we show that all 3-manifolds of a family introduced by M. J. Dunwoody are cy...
Abstract A knot K is called a 1-genus 1-bridge knot in a 3-manifold M if (M, K) has a Heegaard split...
Abstract. We find explicit models for the PSL2(C)- and SL2(C)-character varieties of the fundamental...
Abstract. We introduce a geometric invariant of knots in S3, called the first-order genus, that is d...
A knot is a smooth embedding of the unit sphere S1 into R3.Two knots are said to be equivalent if th...
We analyze the two variable series invariant for knot complements originating from a categorificatio...
We analyze the two variable series invariant for knot complements originating from a categorificatio...
AbstractIn this paper, we characterize closed incompressible surfaces of genus two in the complement...
We say a knot k in the 3-sphere S-3 has Property I E if the infinite cyclic cover of the knot exteri...
AbstractA Heegaard splitting for S3 gives a 1-bridge presentation for a knot k⊂S3 if the knot inters...
In this paper we show that all 3-manifolds of a family introduced by M. J. Dunwoody are cyclic cover...
AbstractWe say a knot k in the 3-sphere S3 has Property IE if the infinite cyclic cover of the knot ...
In this paper we show that all 3-manifolds of a family introduced by M. J. Dunwoody are cyclic cover...
grantor: University of TorontoA well known family of knots is the torus knots. These are t...
grantor: University of TorontoA well known family of knots is the torus knots. These are t...
Abstract. In this paper we show that all 3-manifolds of a family introduced by M. J. Dunwoody are cy...
Abstract A knot K is called a 1-genus 1-bridge knot in a 3-manifold M if (M, K) has a Heegaard split...
Abstract. We find explicit models for the PSL2(C)- and SL2(C)-character varieties of the fundamental...
Abstract. We introduce a geometric invariant of knots in S3, called the first-order genus, that is d...
A knot is a smooth embedding of the unit sphere S1 into R3.Two knots are said to be equivalent if th...
We analyze the two variable series invariant for knot complements originating from a categorificatio...
We analyze the two variable series invariant for knot complements originating from a categorificatio...