Braids with as many full twists as strands realize the braid index

Feller, Peter; Hubbard, Diana

doi:10.1112/topo.12112

Cited by 5 publications

(3 citation statements)

References 45 publications

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“…. We were able to answer Question 3 in the positive for n = 3 and, for general n, with the stronger assumption |ω(β)| > n − 1; see [FH19]. Hence, we feel justified to ask Question 1.…”

Section: Context and Motivation: From Braided Links To Open Books Via...mentioning

confidence: 88%

Examples of non-minimal open books with high fractional Dehn twist coefficient

Feller,

Hubbard

2020

Preprint

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In this short note we construct examples of open books for 3manifolds that show that arbitrarily high twisting of the monodromy of the open book does not guarantee maximality of the Euler characteristic of the pages among the open books supporting the same contact manifold. We find our examples of open books as the double branched covers of families of closed braids studied by Malyutin and Netsvetaev.

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“…. We were able to answer Question 3 in the positive for n = 3 and, for general n, with the stronger assumption |ω(β)| > n − 1; see [FH19]. Hence, we feel justified to ask Question 1.…”

Section: Context and Motivation: From Braided Links To Open Books Via...mentioning

confidence: 88%

Examples of non-minimal open books with high fractional Dehn twist coefficient

Feller,

Hubbard

2020

Preprint

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“…Figure 3: A schematic of a cobordism between K D O and the connected sum of torus knots J " D T 2; P r i D1 p i C" p # T 2;q 1 C" 1 # T 2;q 2 C" 2 # # T 2;q r C" r realized by r 1 C " saddle moves. so (18) and (19)…”

Section: The Upsilon Invariant Of Positive 3-braid Knotsmentioning

confidence: 99%

“…Remark 6.2 The fractional Dehn twist coefficient was computed for 3-braids in Murasugi normal form (see Definition 4.15) in [29, Proposition 6.6].In the proof of Corollary 6.1, we will use that the fractional Dehn twist coefficient of any 3-braid is completely determined by the writhe wr. / and the homogenized upsilon invariant Q of : we have, by[19, Theorem 1.3],(32)!. / D Q .…”

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confidence: 99%

The upsilon invariant at 1 of 3–braid knots

Truöl

2023

Algebr. Geom. Topol.

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We provide explicit formulas for the integer-valued smooth concordance invariant .K/ D ‡ K .1/ for every 3-braid knot K. We determine this invariant, which was defined by Ozsváth, , by constructing cobordisms between 3-braid knots and (connected sums of) torus knots. As an application, we show that for positive 3-braid knots K several alternating distances all equal the sum g.K/ C .K/, where g.K/ denotes the 3-genus of K. In particular, we compute the alternation number, the dealternating number and the Turaev genus for all positive 3-braid knots. We also provide upper and lower bounds on the alternation number and dealternating number of every 3-braid knot which differ by 1. 57K10; 20F36, 57K18Ã 2`: By Murasugi's classification of the conjugacy classes of 3-braids [45, Proposition 2.1], indeed all 3-braid knots -except for the torus knots that are closures of 3-braidsare covered by Theorem 1.1. However, for torus knots the invariant can be calculated explicitly by a combinatorial, inductive formula in terms of their Alexander polynomial [46, Theorem 1.15]; see (12) below. Hence, we have indeed determined .K/ for all 3-braid knots K.As an application of Theorem 1.1, we show that the following invariants coincide for positive 3-braid knots -knots that are the closure of positive 3-braids.

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