講 演 者 |
:Selman Akbulut (Michigan State University, USA ) |
タ イ ト ル |
:Corks, Palfs, exotic structures on 4-manifolds |
|
(アブストラクト)
(PDF) |
日 時 |
:2月2日(金)15:00~16:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:安原晃 (東京学芸大学 ) |
タ イ ト ル |
:On classifications of links up to $C_n$-moves
(絡み目の$C_n$-moveによる分類について) |
|
(アブストラクト)
(PDF) |
日 時 |
:1月26日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:宮澤康行 (山口大学大学院理工学研究科) |
タ イ ト ル |
:A variety of virtual link polynomial with multiple variables
(仮想絡み目の多変数多項式不変量の変種) |
|
(アブストラクト)
(PDF) |
日 時 |
:1月19日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:田山育男 (大阪市立大学数学研究所) |
タ イ ト ル |
:Enumerating 3-manifolds by a canonical order II |
|
(アブストラクト)
(PDF) |
日 時 |
:1月19日(金)15:00~16:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:森内博正 (大阪市立大学大学院理学研究科) |
タ イ ト ル |
:Enumerations of theta-curves and handcuff graphs
(Θ-曲線と手錠グラフの表について) |
|
(アブストラクト)
(PDF) |
日 時 |
:1月12日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:長郷文和 (東京工業大学大学院理工学研究科数学専攻) |
タ イ ト ル |
:Algebraic equations and knot invariants |
|
(アブストラクト)
(PDF) |
日 時 |
:1月12日(金)15:00~16:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:秋吉宏尚 (大阪市立大学数学研究所) |
タ イ ト ル |
:Volume of the convex core of a punctured torus group
(穴あきトーラス群の凸核の体積) |
|
(アブストラクト)
(PDF) |
日 時 |
:12月1日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:石井敦 (大阪大学大学院理学研究科) |
タ イ ト ル |
:The pole diagram and the Miyazawa polynomial
(ポールダイアグラムと宮澤多項式) |
|
(アブストラクト)
(PDF) |
日 時 |
:11月24日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:中村拓司 (大阪電気通信大学工学部数理科学研究センター ) |
タ イ ト ル |
:Notes on Futer-Purcell's inequality for genera of knots
and hyperbolic knots with trivial Alexander polynomial
(結び目の種数に対するFuter-Purcellの不等式と
自明なAlexander多項式を持つ双曲結び目について) |
|
(アブストラクト)
(PDF) |
日 時 |
:11月24日(金)15:00~16:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:鎌田聖一 (広島大学大学院理学研究科) |
タ イ ト ル |
:Quandles with good involutions and their homologies
(良い対合写像を伴うカンドルとそのホモロジーについて) |
|
(アブストラクト)
(PDF) |
日 時 |
:11月10日(金)17:00~18:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:村井紘子 (奈良女子大学人間文化研究科) |
タ イ ト ル |
:Gap of the depths of adjacent leaves of finite depth foliations
(深さ有限の葉層構造の隣接する葉の深さのgapに ついて) |
|
(アブストラクト)
(PDF) |
日 時 |
:11月10日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:金信泰造 (大阪市立大学大学院理学研究科・数学教室) |
タ イ ト ル |
:The block numbers of 2-bridge knots and links
(2本橋絡み目のブロック数) |
|
(アブストラクト)
(PDF) |
日 時 |
:10月27日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:小沢 誠 (駒澤大学総合教育研究部自然科学部門) |
タ イ ト ル |
:A property of diagrams of the trivial knot
(自明結び目の正則表示の性質) |
|
(アブストラクト)
(PDF) |
日 時 |
:10月20日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:Alexander Stoimenow (京都大学数理解析研究所 COE研究員) |
タ イ ト ル |
:Bennequin surfaces and braid index of alternating knots |
|
(アブストラクト)
(PDF) |
日 時 |
:10月13日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:金信泰造 (大阪市立大学大学院理学研究科・数学教室) |
タ イ ト ル |
:Finite-Type Invariants of Order 4 for Oriented 2-Component links |
|
(アブストラクト)
(PDF) |
日 時 |
:7月7日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:門上晃久 (大阪市立大学数学研究所 COE研究所員) |
タ イ ト ル |
:On the Alexander polynomial satisfying Ozsv\'ath-Szab\'o's condition for lens sugery |
|
(アブストラクト)
(PDF) |
日 時 |
:6月30日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:Nafaa Chbili (COE research member, OCAMI) |
タ イ ト ル |
:Toward an equivariant Khovanov homology |
|
(アブストラクト)
(PDF) |
日 時 |
:6月30日(金)14:00~15:30 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:田中利史 (大阪市立大学数学研究所 COE上級研究所員) |
タ イ ト ル |
:On slice knots in 4-manifolds |
|
(アブストラクト)
(PDF) |
日 時 |
:6月23日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:塚本達也 (早稲田大学理工学部 日本学術振興会特別研究員(PD)) |
タ イ ト ル |
:Special positions for spanning surfaces in link complements |
|
(アブストラクト)
(PDF) |
日 時 |
:6月16日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
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講 演 者 |
:新庄玲子 (大阪市立大学数学研究所, COE研究所員) |
タ イ ト ル |
:An infinite sequence of non conjugate $4$-braids
representing the same knot of braid index 4 |
|
(アブストラクト)
(PDF) |
日 時 |
:5月26日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:Gwenael Massuyeau
(CNRS - Louis Pasteur University, Strasbourg, CNRS researcher) |
タ イ ト ル |
:Some finiteness properties for the Reidemeister-Turaev torsion of three-manifolds. |
|
(アブストラクト)
(PDF) |
日 時 |
:5月19日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:Yo'av Rieck (University of Arkansas, Assistant Professor) |
タ イ ト ル |
:The growth rate of tunnel numbers of m-small knots |
|
(アブストラクト)
(PDF) |
日 時 |
:5月12日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:岩切雅英
(広島大学大学院理学研究科数学専攻、日本学術振興会特別研究員 (PD)) |
タ イ ト ル |
:Unknotting singular surface braids by crossing changes |
|
(アブストラクト)
(PDF) |
日 時 |
:4月28日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:山本 亮介 (大阪市立大学数学研究所 COE専任研究所員) |
タ イ ト ル |
:Overtwisted オープンブック分解と Stallings twist |
|
(アブストラクト)
(PDF) |
日 時 |
:4月21日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
講 演 者 |
:藤原健一 (東京工業大学 大学院理工学研究科数学専攻 博士課程2年) |
タ イ ト ル |
:Refined Kirby calculus for rational homology spheres of prime orders |
|
(アブストラクト)
(PDF) |
日 時 |
:4月14日(金)16:00~17:00 |
場 所 |
:数学 第3セミナー室(3153) |
|
Top |
|
|
講 演 者: |
:Selman Akbulut (Michigan State University, USA ) |
タ イ ト ル: |
:Corks, Palfs, exotic structures on 4-manifolds |
One way to understand 4-manifolds is to decompose them it into small understandable pieces (Corks), and make these pieces symplectic Lefschetz fibrations (Palfs). We will survey these results, and as an example discuss such decomposition of an exotic rational surface.
講 演 者: |
:安原晃 (東京学芸大学 ) |
タ イ ト ル: |
:On classifications of links up to $C_n$-moves
(絡み目の$C_n$-moveによる分類について) |
A {\em $C_n$-move} ($n\in{\Bbb N}$) is a local move on links defined by
Habiro, which can be regarded as a `higher order crossing change'. The
{\em $C_n$-equivalence} is an equivalence relation on links generated by
$C_n$-move. The $C_m$-equivalence implies the $C_n$-equivalence for $m>n$.
So the {\em $C_n$-classification}, which is the classification up to $C_n$-equivalence,
of links becomes finer as $n$ increases. The $C_2$-classification of links
and the $C_3$-classification of links with 2 or 3 components, or of algebraically
split links are known. Here we give several classifications of certain
sets of links by using Milnor invariants.
講 演 者: |
宮澤康行 (山口大学大学院理工学研究科) |
タ イ ト ル: |
A variety of virtual link polynomial with multiple variables
(仮想絡み目の多変数多項式不変量の変種) |
The speaker introduced a virtual link polynomial with multiple variables
in the workshop "Tohoku Knot Seminar" at Zao in Yamagata in late
autumn of 2006. In this talk, we construct a variety of multi-variable
polynomial for virtual links by adding the concept of a weight map to the
definition of the above polynomial. We also refer to a relationship between
the new polynomial and a polynomial invariant defined by the speaker before.
(講演者は,昨年11月に山形・蔵王で開かれた「東北結び目セミナー」にて,仮想絡み目の多変数多項式不変量を紹介した。 今回の講演では,その多項式不変量の定義において
weight map と呼ばれる写像の概念を導入することによって,多項式不変量の変種が構成できることを示す。また,その多項式不変量と講演者が以前に定義した仮想絡み目の多項式不変量との関係についても触れる予定である。)
講 演 者: |
田山育男 (大阪市立大学数学研究所) |
タ イ ト ル: |
Enumerating 3-manifolds by a canonical order II |
This work is a joint work with A. Kawauchi.
A well-order (called a {\it canonical order}) was introduced on the set
of links by A. Kawauchi [K].
This well-order naturally induces a well-order on the set of prime link
exteriors and eventually induces a well-order on the set of closed connected
orientable $3$-manifolds.
We assign to every link a lattice point whose length is equal to the minimal
crossing number on closed braid forms of the link. We call this number
the {\it length} of the link. We note that a link $L$ is smaller than a
link $L'$ in the canonical order if the length of $L$ is smaller than that
of $L'$. We define the {\it length} of a prime link exterior as the minimal
length of a prime link whose exterior is homeomorphic to the given prime
link exterior and we define the {\it length} of a closed connected orientable
$3-$manifold is the minimal length on prime link exteriors realizing the
$3-$manifold as the $0$ surgery manifold along the prime link.
With respect to the canonical order, we enumerated the prime links with
up to length $10$ [KT1] and the prime link exteriors with up to length
$9$ [KT2]. We are now enumerating the $3-$manifolds with up to length $9$.
We classify the manifolds according to their first homology groups. There
are 10 types of groups $0,{\bf Z},{\bf Z}\oplus {\bf Z},{\bf Z}\oplus {\bf
Z}\oplus {\bf Z}, {\bf Z}\oplus {\bf Z}_2\oplus {\bf Z}_2, {\bf Z}_2,{\bf
Z}_2\oplus {\bf Z}_2, {\bf Z}_3\oplus {\bf Z}_3,{\bf Z}_4,{\bf Z}_4\oplus
{\bf Z}_4$ and we have respectively 16,62,16,4,5,7,15,7,5,5 links with
these types of groups. We enumerated the manifolds with the group equal
to ${\bf Z}$ in [KT3]
In this talk, we enumerate the manifolds with the group equal to ${\bf
Z}\oplus {\bf Z},{\bf Z}\oplus {\bf Z}\oplus {\bf Z}, {\bf Z}_2,{\bf Z}_2\oplus
{\bf Z}_2, {\bf Z}_4,{\bf Z}_4\oplus {\bf Z}_4$..
{\bf References}
[K] A. Kawauchi, A tabulation of 3-manifolds via Dehn surgery, Boletin
de la Sociedad Matematica Mexicana (3) 10 (2004), 279--304.
[KT1] A. Kawauchi and I. Tayama, Enumerating prime links by a canonical
order, Journal of Knot Theory and Its Ramifications Vol. 15, No. 2 (2006)
217--237
[KT2] A. Kawauchi and I. Tayama, {\it Enumerating the exteriors of prime
links by a canonical order}, in: Proc. Second East Asian School of Knots,
Links, and Related Topics (Darlian, Aug. 2005), to appear.
[KT3] A. Kawauchi and I. Tayama, {\it Enumerating $3-$manifolds by a canonical
order}, in: Proc. of ILDT (Hiroshima Univ., July 2006), to appear.
講 演 者: |
森内博正 (大阪市立大学大学院理学研究科) |
タ イ ト ル: |
Enumerations of theta-curves and handcuff graphs
(Θ-曲線と手錠グラフの表について) |
We enumerate all the $\theta$-curves and handcuff graphs with up to seven
crossings by using algebraic tangles and prime basic $\theta$-polyhedra.
Here, a $\theta$-polyhedron is a connected graph embedded in 2-sphere,
whose two vertices are 3-valent, and the others are 4-valent. There exist
twenty-four prime basic $\theta$-polyhedra with up to seven 4-valent vertices.
We can obtain a $\theta$-curve or handcuff graph diagram from a prime basic
$\theta$-polyhedron by substituting algebraic tangles for their 4-valent
vertices.
講 演 者: |
長郷文和 (東京工業大学大学院理工学研究科数学専攻) |
タ イ ト ル: |
Algebraic equations and knot invariants |
In this talk, for a knot $K$ in 3-sphere $S3$, we define algebraic varieties
$\mathcal{F}^{(d)}(K)$ ($d=1,2,3$) in a complex space $\mathbb{C}^{N}$
in the following steps. For a braid presentation $\sigma$ of a knot $K$,
we first construct finitely many polynomials $\{p_{\sigma, i}\}_i$ on $\mathbb{C}^{N}$
by using an action of the braid $\sigma$ on the Kauffman bracket skein
module (KBSM) of a handlebody at $t=-1$ with {\it trace-free condition}.
Then the ideal $\mathcal{SL}^{(3)}(\sigma)$ generated by the polynomials
$\{p_{\sigma,i}\}_i$ gives an algebraic variety $\mathcal{F}^{(3)}(\sigma)$
via the Hilbert Nullstellensatz. In fact, $\mathcal{F}^{(3)}(\sigma)$ turns
out to be invariant under the Markov moves and thus becomes a knot invariant.
This is a desired variety $\mathcal{F}^{(3)}(K)$. The above process can
be used for {\it restrictions} $\mathcal{SL}^{(2)}(\sigma)$ and $\mathcal{SL}^{(1)}(\sigma)$
of the ideal $\mathcal{SL}^{(3)}(\sigma)$. Then we can get knot invariants
$\mathcal{F}^{(d)}(K)$ ($d=1,2$).
The first variety $\mathcal{F}^{(1)}(K)$ is actually trivial invariant. The third one $\mathcal{F}^{(3)}(K)$ can be considered as a variety containing ``a section'' of the $SL(2,\mathbb{C})$- character variety of the knot group by using Bullock's theorem (quantization of the $SL(2,\mathbb{C})$-character variety). This view point gives relationships of the variety $\mathcal{F}^{(3)} (K)$ with the number of $SL(2,\mathbb{C})$-irreducible metabelian characters of the knot group (the knot determinant), and moreover the maximal degree (or {\it span}) of the A-polynomial $A_K(m,l)$ in terms of $l$, which polynomial is a knot invariant introduced by Cooper, Culler, Gillet, Long and Shalen. Regarding the second variety $\mathcal{F}^{(2)}(K)$, the quotient ring $\mathbb{C}[x_1,\cdots,x_n]/\mathcal{SL}^{(2)} (\sigma)$ ($n\leq N$) turns out to be isomorphic to the degree $0$ knot contact homology which was researched by L. Ng in detail.
講 演 者: |
秋吉宏尚 (大阪市立大学数学研究所) |
タ イ ト ル: |
Volume of the convex core of a punctured torus group
(穴あきトーラス群の凸核の体積) |
For any quasifuchsian punctured torus group, the Weil-Petersson distance
between the conformal structure of the boundary Riemann surface and the
Jorgensen's side parameter is bounded above by a universal constant. J.
Brock showed that the volume of the convex core of a quasifuchsian manifold
is quasi-comparable to the Weil-Petersson distance between the conformal
structures of the boundary Riemann surfaces. Combining these theorems,
the volume of the convex core of a quasifuchsian punctured torus group
is estimated by a combinatorial structure of the Ford domain of the group.
講 演 者: |
石井敦 (大阪大学大学院理学研究科) |
タ イ ト ル: |
The pole diagram and the Miyazawa polynomial
(ポールダイアグラムと宮澤多項式) |
We introduce the pole diagram, which helps to retrieve information from
a knot diagram when we smooth crossings. By using the notion, we define
a bracket polynomial for the Miyazawa polynomial. The bracket polynomial
gives a simple definition and evaluation for the Miyazawa polynomial. Then
we show that the virtual crossing number of a virtualized alternating link
is determined by its diagram.
講 演 者: |
中村拓司 (大阪電気通信大学工学部数理科学研究センター ) |
タ イ ト ル: |
Notes on Futer-Purcell's inequality for genera of knots and
hyperbolic knots with trivial Alexander polynomial
(結び目の種数に対するFuter-Purcellの不等式と
自明なAlexander多項式を持つ双曲結び目について) |
The genus of a knot is an intuitive geometric invariant for knots. However
it is hard to determine in general. It is well-known that the degree of
the Alexander polynomial of a knot estimates the genus of the knot from
below. Recently, Futer-Purcell showed that if a diagram of a link satisfies
certain several conditions then the link is hyperbolic and the genus of
the link is estimated from below by some complexity of a diagram. In this
talk, we introduce Futer-Purcell's inequality and construct a hyperbolic
knot of higher genus but whose Alexander polynomial is trivial by using
the inequality.
講 演 者: |
鎌田聖一 (広島大学大学院理学研究科) |
タ イ ト ル: |
Quandles with good involutions and their homologies
(良い対合写像を伴うカンドルとそのホモロジーについて) |
Quandles and their homologies are used to construct invariants of oriented
links or oriented surface-links in 4-space. On the other hand the knot
quandle can still be defined in the case where the links or surface-links
are not oriented, but in this case it cannot be used to construct homological
invariants. Here we introduce the notion of a quandle with a good involution,
and its homology groups. We can use them to construct invariants of unoriented
links and unoriented, or non-orientable, surface-links in 4-space.
A sketch was given at the conference ``Intelligence of Low Dimensional Topology 2006''.
講 演 者: |
村井紘子 (奈良女子大学人間文化研究科) |
タ イ ト ル: |
Gap of the depths of adjacent leaves of finite depth foliations
(深さ有限の葉層構造の隣接する葉の深さのgapに ついて) |
Depth is one of the well-known invariants of codimension one foliations.
Roughly speaking, depth is a quantity which describes how far from a fiber
bundle structure the foliation is. In this talk, we introduce a quantity
called \lq\lq gap\rq\rq of the foliation to deal with behaviors of depths
of leaves. More precisely, for a depth $k(\geq 1)$ leaf of a foliation
$\mathcal{F}$, we know by the definition of depth of leaves that there
exists a depth $k-1$ leaf in $\overline{L}\setminus L $. However, for a
leaf $L$ of $\mathcal{F}$ which is not at the maximal depth in $\mathcal{F}$,
it is not necessary the case that there exists a leaf $L^\prime$ at depth
$(\textrm{depth}(L)+1)$ such that $L\subset\overline{L^\prime}\setminus
L^ \prime$. In this case, there is a \lq\lq gap\rq\rq\ between the depth
of $L$ and depths of the adjacent leaves. Roughly speaking, the gap of
$\mathcal{F}$ is the maximal value of the gaps between the depths of the
leaves of $\mathcal{F}$. As an application, by using this invariant, we
give an estimation of depth of foliations of the manifolds which we considered
in [M].
[M] H. Murai,
{\it Depths of the Foliations on 3-Manifolds Each of Which Admits Exactly One Depth 0 Leaf}, J. Knot Theory Ramifications, to appear.
講 演 者: |
金信泰造 (大阪市立大学大学院理学研究科・数学教室) |
タ イ ト ル: |
The block numbers of 2-bridge knots and links
(2本橋絡み目のブロック数) |
For a $2$-bridge knot or link, we introduce a new invariant, the {\it block
number} from the Conway presentation. We can determine the block number
by either the Kauffman polynomial, the Brandt-Lickorish-Millett-Ho's $Q$
polynomial, or the Jones polynomial.
講 演 者: |
小沢 誠 (駒澤大学総合教育研究部自然科学部門) |
タ イ ト ル: |
A property of diagrams of the trivial knot
(自明結び目の正則表示の性質) |
We give a necessary condition for a diagram to represent the trivial knot.
A preprint is available from http://arxiv.org/abs/math.GT/0606293.
講 演 者: |
Alexander Stoimenow (京都大学数理解析研究所 COE研究員) |
タ イ ト ル: |
Bennequin surfaces and braid index of alternating knots |
The braid index inequality of Morton-Williams-Franks is exact for many
alternating knots, but Murasugi gave an example of inexact inequality of
crossing number 18, genus 6 and braid index 6. In my talk I will explain
the proof of exactness of the Morton-Williams-Franks inequality for alternating
knots of
1. at most 18 crossings (except Murasugi's example and its mutant)
2. genus at most 4 and
3. braid index at most 4 (actually Morton-Williams-Franks bound at most
4, and here links could be included)
I will explain how to extend these proofs to show that many alternating
knots have a minimal string Bennequin surface (= minimal genus braided
Seifert surface), in particular alternating knots of genus at most 3 or
at most 16 crossings.
講 演 者: |
金信泰造 (大阪市立大学大学院理学研究科・数学教室) |
タ イ ト ル: |
Finite-Type Invariants of Order 4 for Oriented 2-Component links |
We express a basis for the space of finite type invariants of order less
than or equal to four for two-component links in terms of the Conway polynomial,
the linking number, and the HOMFLYPT polynomial.
As an application, we give some formulas relating to the HOMFLYPT and Kauffman polynomials.
講 演 者: |
門上晃久 (大阪市立大学数学研究所 COE研究所員) |
タ イ ト ル: |
On the Alexander polynomial satisfying Ozsv\'ath-Szab\'o's condition for
lens sugery |
P. Ozsv\'ath and Z. Szab\'o [3] showed the following:
[Theorem]
Let $K$ be a knot in $S3$.
If $K$ yields a lens space, then the Alexander polynomial of $K$ has the following form:
$${\mit \Delta}_K(t)=(-1)^m+\sum_{i=1}^m(-1)^{m-i}(t^{c_i}+t^{-c_i}) \quad
(c_0=0<c_1<c_2<\cdots <c_m)$$
Let $T(r, s)$ be an $(r, s)$-torus knot.
The Alexander polynomial of $T(r, s)$ satisfies Ozsv\'ath-Szab\'o's condition above.
For a positive integer $n$, ${\mit \Delta}_{T(r, s)}(t^n)$ also satisfies the condition.
We showed the following:
[Main Theorem]
Let $K$ be a knot in $S3$.
If $K$ yields a lens space and ${\mit \Delta}_K(t)={\mit \Delta}_{T (r,
s)}(t^n)$ where $n$ is a positive integer, then we have $n=1$.
This theorem implies that Ozsv\'ath-Szab\'o's condition does not characterize
the Alexander polynomial of a knot in $S3$ having a lens surgery.
[References]
[1] T. Kadokami,
On the Alexander polynomial satisfying Ozsv\'ath-Szab\'o's condition for
lens sugery, preprint (2006).
[2] T. Kadokami and Y. Yamada,
A deformation of the Alexander polynomials of knots yielding lens spaces, preprint (2006).
[3] P. Ozsv\'ath and Z. Szab\'o,
On knot Floer homology and lens space surgeries, Topology,44 (2005), 1281--1300.
[4] M. Tange,
Ozsv\'ath Szab\'o's correction term and lens surgery, preprint (2006).
講 演 者: |
Nafaa Chbili (COE research member, OCAMI) |
タ イ ト ル: |
Toward an equivariant Khovanov homology |
In this talk, we construct an equivariant Khovanov homology, with coefficients
in the finite field $\F_2$, associated to link diagrams with $\Z_p$-symmetry.
Then we prove that this homology is conserved under equivariant Reidemeister
moves. This equivariant Khovanov homology is better described using the
categorification of the Kauffman bracket skein module of the solid torus.
講 演 者: |
田中利史 (大阪市立大学数学研究所 COE上級研究所員) |
タ イ ト ル: |
On slice knots in 4-manifolds |
Let $M$ be a closed oriented 4-manifold and $L$ be an $n$-component link in $M-{\rm int}B4$. $L$ is called a {\it topologically slice link} in $M$ if $L$ bounds $n$ topologically embedded flat 2-disks in $M-{\rm int}B4$. A $1$-component topologically slice link is called {\it topologically slice knot}. For example, every knot is a topologically slice knot in $S2\times S2$ and every knot with trivial Alexander polynomial is a topologically slice knot in $S4$. However, every knot with nontrivial signature is not a topologically slice knot in $S4$.
In this talk, we show that a punctured $M$ admits at least two smooth strucutures if there exists a topologically slice knot which is not a slice knot in $M$. As a corollary, we show that the punctured $CP2$ admits at least two smooth structures.
講 演 者: |
塚本達也 (早稲田大学理工学部 日本学術振興会特別研究員(PD)) |
タ イ ト ル: |
Special positions for spanning surfaces in link complements |
We study links using the crossing-ball technique of W.Menasco and define
special positions for spanning surfaces in link complements. We show that
if a given spanning surface is in special position, then the boundary of
a neighborhood of the surface is in standard position. Thus we can work
on a closed surface in the link complement instead of working on a surface
with boundary. We also mension that if a link admits an almost alternating
diagram, then we can cut its spanning surface to be in special position.
講 演 者: |
新庄玲子 (大阪市立大学数学研究所, COE研究所員) |
タ イ ト ル: |
An infinite sequence of non conjugate $4$-braids
representing the same knot of braid index 4 |
Before, we showed the following: For any knot represented as a closed n-braid
($n \ge 3$), there exist an infinite sequence of pairwise non conjugate
($n+1$)-braids representing the knot. Using the similar technique, for
some knots of braid index $4$ we construct such an infinite sequence of
pairwise non conjugate $4$- braids. As a consequence, we verify that M.
Hirasawa's candidate of such a sequence of braids is actually an infinite
sequence.
講 演 者: |
Gwenael Massuyeau
(CNRS - Louis Pasteur University, Strasbourg, CNRS researcher) |
タ イ ト ル: |
Some finiteness properties for the Reidemeister-Turaev torsion of three-manifolds. |
The Reidemeister-Turaev torsion is an invariant of a closed oriented three-dimensional
manifold equipped with an Euler structure, with values in the ring of quotients
of the group ring of the first homology group. We will prove that its reductions
by powers of the augmentation ideal are finite-type invariants in the sense
of M. Goussarov and K. Habiro. For this, we will start off by explaining
how their theory of finite-type invariants can be refined to take into
account Euler structures (which is a joint work with F. Deloup).
講 演 者: |
Yo'av Rieck (University of Arkansas, Assistant Professor) |
タ イ ト ル: |
The growth rate of tunnel numbers of m-small knots |
Let $K \subset M$ be a knot in a closed orientable 3-manifold. Let $nK$
be the connected sum of $n$ copies of $k$, $E(\cdot)$ knot exteriors, and
$g(\cdot)$ Heegaard genus. In ``On the growth rate of tunnel number of
knots'' (to appear in {\it Journal fur die reine und angewandte Mathematik},
available at {\verb http://arxiv.org/abs/math.GT/ 0402025 }) we study the
asymptotic behavior of the tunnel number under repeated connected sum operation.
We define the growth rate of the tunnel number of $K$ is defined to be:
$$gr_t(k) = \limsup_{n \to \infty} \frac{t(nK) - n t(K)}{n-1}.$$
Let $g = g(E(K)) - g(M)$. Given an integer $i$ ($1 \leq i \leq g$) let
$b_i$ be the bridge index of $K$ with respect to Heegaard surfaces of $M$
of genus $g(E(K))-i$. In this talk we prove that if $K$ is meridionally
small (that is, the exterior of $K$ admits no essential meridional surface)
than the growth rate of the tunnel number of $K$ is:
$$gr_t(K) = \min_{1 \leq i \leq g} 1 - \frac{i} {b_i}.$$
The tools necessary (the strong Hopf--Haken annulus theorem and the Swallow
Follow Torus Theorem) will be discussed, as well as some corollaries. Some
of the material presented here is still in preparation; some appears in
``Heegaard genus of the connected sum of m-small knots'' (to appear in
{\it Communication in Analysis and Geometry}, available at \verb http://arxiv.org/abs/math.GT/0503229
).
講 演 者: |
岩切雅英
(広島大学大学院理学研究科数学専攻、日本学術振興会特別研究員 (PD)) |
タ イ ト ル: |
Unknotting singular surface braids by crossing changes |
C. A. Giller proved that crossing change is an unknotting operation for surfaces in 4-space. In this talk, we present such an unknotting theorem for singular surface braids, which is given when they have no branch points by S. Kamada. As a consequence, we have Giller's unknotting theorem. Recently, K. Tanaka gave a different proof of our main result.
講 演 者: |
山本 亮介 (大阪市立大学数学研究所 COE専任研究所員) |
タ イ ト ル: |
Overtwisted オープンブック分解と Stallings twist |
We discuss a characterization of "overtwisted open books" on
a closed oriented $3$-manifold, i.e., open book decompositions corresponding
to overtwisted contact structures via the Giroux's one-to-one correspondence.
We focus on a simple closed curve on fiber surface of an open book along
which one can perform Stallings twist, and see that a given open book is
overtwisted if and only if it is equivalent to an open book with Stallings
twist up to positive stabilization, i.e., plumbing a positive Hopf band
to the fiber surface.
講 演 者: |
藤原健一 (東京工業大学 大学院理工学研究科数学専攻 博士課程2年) |
タ イ ト ル: |
Refined Kirby calculus for rational homology spheres of prime orders |
Every integral homology 3-sphere is presented by a framed link whose components have surgery coefficients +-1 and linking numbers 0. By using such framed links and the special Kirby move due to K. Habiro, we can refine Kirby calculus. In this talk, we aim to extend Habiro's refinement to rational homology 3-spheres of prime orders.
最終更新日: 2007年1月15日
(C)大阪市大数学教室
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