- 追加された行はこの色です。
- 削除された行はこの色です。
* 2009年度 組合せ数学セミナー [#g3c8c5c4]
-世話人: 坂内 英一(九大数理)
*** 2010年 3月16日(火) - 3月18日(木)(ミニ集会「代数的組合せ論」) [#r075ebd7]
-場所: 神戸学院大学ポートアイランドキャンパス B号館B210講義室
-世話人: 宗政 昭弘(東北大学),原田 昌晃(山形大学,JSTさきがけ),生田 卓也(神戸学院大学)
-プログラム
|>|>|3月16日|
|14:00-14:50|徳重典英(琉球大教育)|$n$次元立方体の中の大きな$n$次元正則単体|
|15:05-15:35|篠原雅史(鈴鹿高専)|低い次元における距離集合について|
|15:45-16:15|谷口哲至(松江高専)|On graphs with the smallest eigenvalue at least $-\frac{1}{2}(3+\sqrt{5})$ --an irreducibility of Hoffman graphs--|
|16:25-16:55|篠原英裕(大阪大情報)|有限群の near-factor と関連するグラフについて|
#br
|>|>|3月17日|
|9:30-10:15|須田庄(東北大情報)|Mutually unbiased bases に関連する組合せ構造(その1)|
|10:30-11:00|田中利恵(東北大情報)|Classification of commutative association schemes with almost commutative Terwilliger algebras|
|11:10-11:40|北詰正顕(千葉大理)|Neighbors of the Leech lattice|
|13:30-14:20|坂内英一(九大数理)|$t$-designs in real hyperbolic spaces|
|14:30-15:00|三枝崎剛(北大理)|Conformal designs of lattice type vertex operator algebras|
|15:20-15:50|田辺顕一朗(北大理)|有限群の作用で不変な部分微分体上の頂点代数としての有限次元加群|
|16:00-16:15|重住淳一(九大数理)|A new example of Euclidean tight 6-design|
|16:20-16:35|佐野良夫(京大数理)|The competition-common enemy graphs of digraphs satisfying the conditions $C(p)$ and $C'(p)$|
|16:40-16:55|谷口浩朗(香川高専)|On $d$-dimensional Buratti-Del Fra type dual hyperovals in $PG(3d, 2)$|
|17:30-19:30|>|懇親会(JoliPort)|
#br
|>|>|3月18日|
|9:30-10:15|須田庄(東北大情報)|Mutually unbiased bases に関連する組合せ構造(その2)|
|10:30-11:00|知念宏司(近畿大理工)|非自己双対 Golay 符号から作られる不変式のRiemann 予想について|
|11:10-11:40|田村宏樹(東北大情報)|Extended constacyclic codes|
|11:50-12:20|吉田知行(北大理)|対称群を使った分割表のランダムサンプリングと一致数の正確な生起確率|
*** 第2回 2010年 2月10日(水) [#wac1537c]
-題名: Cellular automata and groups: dynamical aspects of infinite groups
-時間: 15:00~16:30
-場所: 伊都キャンパス 数理棟 1階 122番教室
-講師: Tullio Ceccherini-Silberstein (University of Sannio)
-概要:~
In this talk I would like to introduce the audience to the theory of
cellular automata and groups focusing on some dynamical aspects of infinite groups
(amenability, residual finiteness, local finiteness, periodicity,
surjunctivity and soficity).
As an application, we shall also describe a solution to the
Kaplansky conjecture on the stable finiteness of groups rings
(with coefficients in any field) for the class of sofic groups.
*** 第1回 2010年 2月 9日(火) [#tb288609]
-題名: On the Okounkov-Vershik approach to the representation theory of the symmetric groups
-時間: 15:00~16:30
-場所: 伊都キャンパス 数理棟 1階 122番教室
-講師: Tullio Ceccherini-Silberstein (University of Sannio)
-概要:~
In this talk, I would like to describe the representation theory
of the symmetric groups along the new lines developed by several authors,
in particular by A.M. Vershik, G.I. Olshanskii and A. Okounkov.
The tools/ingredients of this new approach are either completely new,
or were not fully understood in their whole importance by previous
authors. I'll try to analyze such tools/ingredients which consist of:~
(i) the algebras of conjugacy-invariant functions, the algebras of bi-$K$-invariant functions,
the Gelfand pairs and their spherical
functions;~
(ii) the Gelfand-Tsetlin algebras and their corresponding bases;~
(iii) the branching diagrams, the associated posets and the content of a tableau;~
(iv) the Young-Jucys-Murphy elements and their spectral analysis;~
(v) the characters of the symmetric group viewed as spherical functions.
