On computational complexity of computing polynomial invariants of links

• Project/Area Number: 14580391
• Research Category: Grant-in-Aid for Scientific Research (C)
• Allocation Type: Single-year Grants
• Section: 一般
• Research Field: 計算機科学
• Research Institution: Nihon University
• Principal Investigator: TANI Seiichi Nihon University, College of Humanities and Sciences, Associate Professor, 文理学部, 助教授 (70266708)
• Co-Investigator(Kenkyū-buntansha): YAKU Takeo Nihon University, College of Humanities and Sciences, Professor, 文理学部, 教授 (90102821) ; TODA Seinosuke Nihon University, College of Humanities and Sciences, Professor, 文理学部, 教授 (90172163) ; YAMAMOTO Makoto Chuo University, Faculty of Science and Engineering, Professor, 理工学部, 教授 (10158305)
• Project Period (FY): 2002 – 2004
• Project Status: Completed (Fiscal Year 2004)
• Budget Amount: ¥2,800,000 (Direct Cost: ¥2,800,000); Fiscal Year 2004: ¥600,000 (Direct Cost: ¥600,000); Fiscal Year 2003: ¥800,000 (Direct Cost: ¥800,000); Fiscal Year 2002: ¥1,400,000 (Direct Cost: ¥1,400,000)
• Keywords: computational topology / Jones polynomial / discrete algorithms / interactive proof system / knots / links / braid group / conjugacy problem / 2橋絡み目 / 閉3ブレイド絡み目 / PSPACE / ジョーンズ多項式の計算 / 3-closed braid 絡み / 多項式時間階層 / NP-完全 / 自明性判定問題

Research Abstract

We investigate computational complexity of computing polynomial invariants of links. We also investigate the computational complexity of the problem whether a knot is unknotting and the computational complexity of the computational complexity of the conjugacy problem for braids.
We give fast algorithms for computing Jones polynomials of 2-bridge links and closed 3-braid links from their Tait graphs. Given a Tait graph with n edges, these algorithms run with O(n) arithmetic operations of polynomials of degree O(n) namely in O(n^2log n) time, where n is the number of the crossings of the link diagram. We also give a fast algorithm for computing Jones polynomials of Montesinos links from lists of integer sequences. Given a list of integer sequences that represents a link diagram with $n$ crossings, this algorithm runs with O(n) operations of polynomials of degree O(n).
We construct an interactive proof system for the Knotting Problem, and prove that the problem is contained in IP. Consequently, the Unknotting Problem is contained in both AM and co-AM.
The conjugacy problem for the n-strand braids is the following decision problem : Given two braids V, W, determine whether there exists a braid C such that CV is equivalent to W C. We give a proof that the conjugacy problem for braids is in PSPACE.

Research Products

• [Journal Article] Unknotting is in AM ∩ co-AM (2005)
  • Author(s): M.Hara, M.Yamamoto, S.Tani
  • Journal Title: Proceedings of the 16th ACM-SIAM Symposium on Discrete Algorithm Pages: 359-365
  • NAID: 110003178737
  • Description: 「研究成果報告書概要(和文)」より
• [Journal Article] Unknotting is in AM ∩ co-AM. (2005)
  • Author(s): M.Hara, M.Yamamoto, S.Tani
  • Journal Title: Proceedings of the 16th ACM-SIAM Symposium on Discrete Algorithm Pages: 359-365
  • NAID: 110003178737
  • Description: 「研究成果報告書概要(欧文)」より
• [Journal Article] Fast Algorithms for Computing Jones Polynomials of Certain Links (2004)
  • Author(s): M.Murakami, M.Hara, M.Yamamoto, S.Tani
  • Journal Title: 京都大学数理解析研究所講究録 1375 Pages: 174-180
  • Description: 「研究成果報告書概要(和文)」より
• [Journal Article] On Computational Complexity of the Conjugacy Problem for Braids (2004)
  • Author(s): M.Matsuba, S.Tani
  • Journal Title: Technical Report of IEICE COMP-2003-88 Pages: 17-23
  • NAID: 110003178825
  • Description: 「研究成果報告書概要(和文)」より
• [Journal Article] Fast Algorithms for Computing Jones Polynomials of Certain Links. (2004)
  • Author(s): M.Murakami, M.Kara, M.Yamamoto, S.Tani
  • Journal Title: Research Institute for Mathematical Sciences Vol.1375 Pages: 174-180
  • Description: 「研究成果報告書概要(欧文)」より
• [Journal Article] On Computational Complexity of the Conjugacy Problem for Braids. (2004)
  • Author(s): M.Matsuba, S.Tani
  • Journal Title: Technical Report of IEICE COMP-2003-88 Pages: 17-23
  • NAID: 110003178825
  • Description: 「研究成果報告書概要(欧文)」より
• [Journal Article] The complexity of counting self-avoiding walks in subgraphs of two-dimensional grids and hypercubes (2003)
  • Author(s): M.Liskiewicz, M.Ogihara, S.Toda
  • Journal Title: Theoretical Computer Science 304, 1-3 Pages: 129-156
  • Description: 「研究成果報告書概要(和文)」より
• [Journal Article] 学術論文関係情報のグラフ描画問題に基づく視覚化手法 (2003)
  • Author(s): 宮寺庸造, 田地晶, 及部佳代子, 横山節雄, 近谷英昭, 夜久竹夫
  • Journal Title: 電子情報通信学会論文誌 J87-D-I No.3 Pages: 1-18
  • NAID: 110003171316
  • Description: 「研究成果報告書概要(和文)」より
• [Journal Article] グラフ同型写像の数え上げ問題に対するアルゴリズムについて (2002)
  • Author(s): 名古屋孝幸, 谷聖一, 戸田誠之助
  • Journal Title: 電子情報通信学会論文誌 J85-D-I No.5 Pages: 424-435
  • NAID: 110003184771
  • Description: 「研究成果報告書概要(和文)」より
• [Journal Article] A Polynomial-Time Algorithms for Counting Graph Isomorphisms among Partial κ-Trees (in Japanese). (2002)
  • Author(s): T.Nagoya, S.Tani, S.Toda
  • Journal Title: IEICE Transactions Vol.J85-D-I, No.5 Pages: 424-435
  • Description: 「研究成果報告書概要(欧文)」より
• [Publications] M.Matsuba, S.Tani: "On Computational Complexity of the Conjugacy Problem for Braids"Technical Report of IEICE. CPMP-2003-88. 17-23 (2004)
• [Publications] 原正雄, 谷聖一, 山本慎: "結び目の非自明性判定問題の計算量について"京都大学数理解析研究所講究録. 1323. 227-232 (2003)
• [Publications] M.Liskiewicz, M.Ogihara, S.Toda: "The complexity of counting self-avoiding walks in subgraphs of two-dimensional grids and hypercubes"Theoretical Computer Science. 304,1-3. 129-156 (2003)
• [Publications] 宮寺庸造, 田地晶, 及部佳代子, 横山節雄, 近谷英昭, 夜久竹夫: "学術論文関係情報のグラフ描画問題に基づく視覚化手法"電子情報通信学会論文誌, D-1. Vol.J87-D-I. 1-18 (2003)
• [Publications] 原正雄, 谷聖一, 山本慎: "Arborescent絡み目に対するジョーンズ多項式計算アルゴリズム"情報技術レターズ. vol.1. 16-17 (2002)
• [Publications] 名古屋孝幸, 谷聖一, 戸田誠之助: "グラフ同型写像の数え上げ問題に対するアルゴリズムについて"電子情報通信学会論文誌. J85-D-I, No.5. 424-435 (2002)