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Montesinos Amilibia, José María
(1984)
*On twins in the four-sphere. II.*
Quarterly Journal of Mathematics , 35
(137).
pp. 73-83.
ISSN 0033-5606

Official URL: http://qjmath.oxfordjournals.org/content/35/1/73.full.pdf+html

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http://qjmath.oxfordjournals.org/ | Publisher |

## Abstract

E. C. Zeeman [Trans. Amer. Math. Soc. 115 (1965), 471–495; MR0195085 (33 #3290)] introduced the process of twist spinning a 1-knot to obtain a 2-knot (in S4), and proved that a twist-spun knot is fibered with finite cyclic structure group. R. A. Litherland [ibid. 250 (1979), 311–331; MR0530058 (80i:57015)] generalized twist-spinning by performing during the spinning process rolling operations and other motions of the knot in three-space. The first paper generalizes those results by introducing the concept of a twin. A twin W is a subset of S4 made up of two 2-knots R and S that intersect transversally in two points. The prototype of a twin is the n-twist spun of K (that is, the union of the n-twist spun knot of K and the boundary of the 3-ball in which the original knot lies). The exterior of a twin, X(W), is the closure of S4−N(W), where N(W) is a regular neighborhood of W in S4.

The first paper considers properties of X(W), and uses these to characterize the automorphisms of a 2-torus standardly embedded in S4, which extend to S4, and also to prove that any homotopy sphere obtained by Dehn surgery on such a 2-torus is the real S4.

The second paper is devoted to the fibration problem, i.e. given a twin in S4, try to understand what surgeries in W give a twin W′ which has a component that is a fibered knot (as in the Zeeman theorem). This approach yields alternative proofs of the twist-spinning theorem of Zeeman, and of the roll-twist spinning results of Litherland. New fibered 2-knots are produced through these methods.

Item Type: | Article |
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Uncontrolled Keywords: | twins in the four-sphere; twist-spinning a one-knot; two-knot; rolling; n-twin; Dehn-surgeries; Gluck's homotopy sphere |

Subjects: | Sciences > Mathematics > Topology |

ID Code: | 17188 |

Deposited On: | 23 Nov 2012 11:55 |

Last Modified: | 12 Dec 2018 15:14 |

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