A family of embedding spaces

Budney, Ryan

doi:10.2140/gtm.2008.13.41

Cited by 30 publications

(121 citation statements)

References 76 publications

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“…and their generators. Recently, Budney [4] has given a description of such Haefliger knots in terms of the space of long knots, which is related to the Litherland-type deform-spinning.…”

Section: Haefliger's Knotsmentioning

confidence: 99%

“…‫ޒ‬ n being the standard inclusions on jxj 1 for x 2 ‫ޒ‬ j . Then, Budney [4], using results of Goodwillie [9], showed that there is an isomorphism 2 K 4;1 ! C …”

Section: Haefliger's Knotsmentioning

confidence: 99%

“…Note that he deals with more general cases in [4,Section 3], so that he constructs an epimorphism 2d 2 K dC2;1 ! C Budney [4] showed that the maps K 4;1 ! K 5;2 and K 5;2 !…”

Section: ‫ޚ‬mentioning

confidence: 99%

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High-codimensional knots spun about manifolds

Roseman¹,

Takase²

2007

Algebr. Geom. Topol.

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Using spinning we analyze in a geometric way Haefliger's smoothly knotted .4k 1/-spheres in the 6k -sphere. Consider the 2-torus standardly embedded in the 3-sphere, which is further standardly embedded in the 6-sphere. At each point of the 2-torus we have the normal disk pair: a 4-dimensional disk and a 1-dimensional proper subdisk. We consider an isotopy (deformation) of the normal 1-disk inside the normal 4-disk, by using a map from the 2-torus to the space of long knots in 4-space, first considered by Budney. We use this isotopy in a construction called spinning about a submanifold introduced by the first-named author. Our main observation is that the resultant spun knot provides a generator of the Haefliger knot group of knotted 3-spheres in the 6-sphere. Our argument uses an explicit construction of a Seifert surface for the spun knot and works also for higher-dimensional Haefliger knots. 57R40; 57R65, 55P35

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“…and their generators. Recently, Budney [4] has given a description of such Haefliger knots in terms of the space of long knots, which is related to the Litherland-type deform-spinning.…”

Section: Haefliger's Knotsmentioning

confidence: 99%

“…‫ޒ‬ n being the standard inclusions on jxj 1 for x 2 ‫ޒ‬ j . Then, Budney [4], using results of Goodwillie [9], showed that there is an isomorphism 2 K 4;1 ! C …”

Section: Haefliger's Knotsmentioning

confidence: 99%

See 1 more Smart Citation

High-codimensional knots spun about manifolds

Roseman¹,

Takase²

2007

Algebr. Geom. Topol.

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“…Zeeman proved that the complements of co-dimension two -twistspun knots fibre over 1 provided ∕ = 0 [8]. Litherland [7] went on to formulate a general situation where a deform-spun knot complements fibre over 1 . Specifically, Litherland proved that if the diffeomorphism :…”

mentioning

confidence: 99%

“…In the paper [1] the first author gave a new proof of Haefliger's theorem, where the monoid of isotopy classes of smooth embeddings of in is a group, provided − > 2. The heart of the proof is showing that if − > 2, then every knot ( , ) (where…”

mentioning

confidence: 99%

An obstruction to a knot being deform-spun via Alexander polynomials

Budney

Mozgova

2009

Proc. Amer. Math. Soc.

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The persistence of the Chekanov–Eliashberg algebra

Rizell

Sullivan

2020

Sel. Math. New Ser.

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We apply the barcodes of persistent homology theory to the c Chekanov–Eliashberg algebra of a Legendrian submanifold to deduce displacement energy bounds for arbitrary Legendrians. We do not require the full Chekanov–Eliashberg algebra to admit an augmentation as we linearize the algebra only below a certain action level. As an application we show that it is not possible to $$C^0$$ C 0 -approximate a stabilized Legendrian by a Legendrian that admits an augmentation.

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A family of embedding spaces

Cited by 30 publications

References 76 publications

High-codimensional knots spun about manifolds

High-codimensional knots spun about manifolds

An obstruction to a knot being deform-spun via Alexander polynomials

The persistence of the Chekanov–Eliashberg algebra

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