Graduate School of Mathematics, Nagoya University JAPANESE
ADDRESS: Furocho, Chikusaku, Nagoya, Japan / POSTAL CODE: 464-8602 / PHONE: +81-52-789-2429 / FACSIMILE: +81-52-789-2829

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Update: 2012/02/09

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People

Faculty

Awata, Hidetoshi Fujiwara, Kazuhiro Furusho, Hidekazu Garrigue, Jacques
Geisser, Thomas Gyoja, Akihiko Hamanaka, Masashi Hashimoto, Mitsuyasu
Hayashi, Takahiro Hesselholt, Lars Hishida, Toshiaki Hora, Akihito
Inahama, Yuzuru Ishi, Hideyuki Ito, Kentaro Ito, Yukari
Iyama, Osamu Kanno, Hiroaki Kato, Jun Kawahira, Tomoki
Kawamura, Tomomi Kimura, Yoshifumi Kobayashi, Ryoichi Kondo, Shigeyuki
Kubo, Masashi Matsumoto, Kohji Matsumoto, Sho Minami, Kazuhiko
Miyachi, Hyohe Moriyama, Sanefumi Moriyoshi, Hitoshi Nagao, Kentaro
Nagao, Taro Naito, Hisashi Nakanishi, Tomoki Nayatani, Shin
Ohsawa, Takeo Ohta, Hiroshi Okada, Soichi Saito, Hiroshi
Sasahara, Yasuhiro Sasahira, Hirofumi Sato, Takeshi Shoji, Toshiaki
Sugimoto, Mitsuru Suzuki, Hiroshi Tanigawa, Yoshio Tate, Tatsuya
Tsugawa, Kotaro Uzawa, Tohru Yamagami, Shigeru Yoshida, Ken-ichi

*Cooperative faculty

Yasuhiro Sasahara Assistant Professor
OFFICE Rm 339 (formerly Rm 341) in Bldg. Sci. A (internal phone number 5579)
EMAIL sasahara@math.nagoya-u.ac.jp
RESEARCH
  • partial differential
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Hirofumi Sasahira Assistant Professor
OFFICE Rm 506 in Bldg. Sci. 1 (internal phone number 2424)
EMAIL hsasahira@math.nagoya-u.ac.jp
RESEARCH
  • topology
  • gauge theory
PAPERS
  1. H. Sasahira: Spin structures on SeibergWitten moduli spaces, J. Math. Sci. Univ. Tokyo 13 (2006), no 3, 347363.
  2. H. Sasahira: An SO(3)-version of 2-torsion instanton invariants, J. Math. Sci. Univ. Tokyo 15 (2008), no. 2, 257289.
TOP
Takeshi Sato Assistant Professor
OFFICE Rm 359 (formerly Rm 321) in Bldg. Sci. A (internal phone number 2425)
EMAIL sato@math.nagoya-u.ac.jp
RESEARCH
  • special function
  • π
  • modular form
  • modular equation
  • Ramanujan
PAPERS
  1. T. Sato: A quintically converging algorithm for π, in preparation.
TOP
Toshiaki Shoji Professor
OFFICE Rm 505 in Bldg. Sci. 1 (internal phone number 5605)
EMAIL shoji@math.nagoya-u.ac.jp
PERSONAL
WEB		 [Personal Page] http://www.math.nagoya-u.ac.jp/~shoji/eindex.html
RESEARCH
  • representation theory of finite Chevalley groups
  • complex reflection groups and associated Hecke algebras
  • Green functions and Macdonald functions associated to complex reflection groups
PAPERS
  1. T. Shoji: Green functions associated to complex reflection groups, J. Algebra, 245 (2001), no. 2, 650694.
  2. T. Shoji: Character sheaves and almost characters of reductive groups, I, II, Adv. Math., 111 (1995), no. 2, 244313, 111 (1995), 314354.
PRIZES
2001, MSJ Algebra Prize
“Study of representations of finite Chevalley groups”
TOP
Mitsuru Sugimoto Professor
OFFICE Rm 303 in Bldg. Sci. 1 (internal phone number 2544)
EMAIL sugimoto@math.nagoya-u.ac.jp
PERSONAL
WEB		 [Personal Page] http://www.math.nagoya-u.ac.jp/~sugimoto/index-e.html
RESEARCH
  • partial differential equations
  • Fourier analysis
PAPERS
  1. M. Sugimoto: A priori estimates for higher order hyperbolic equations, Math. Z. 215 (1994), 519531.
  2. M. Ruzhansky and M. Sugimoto: A smoothing property of Schrödinger equations in the critical case, Math. Ann. 335 (2006), 645673.
  3. N. Tomita and M. Sugimoto: The dilation property of modulation spaces and their inclusion relation with Besov spaces, J. Funct. Anal. 248 (2007), 79106.
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Hiroshi Suzuki Associate Professor
OFFICE Rm 459 (formerly Rm 421) in Bldg. Sci. A (internal phone number 4830)
EMAIL hiroshis@math.nagoya-u.ac.jp
RESEARCH
  • algebraic number theory
  • capitulation problem
  • unit group
  • graph theory
  • Hamiltonian graph
PAPERS
  1. H. Suzuki: On the capitulation problem, in Class field theoryIts centenary and prospect, Tokyo 1998, Adv. Stud. Pure Math. 30, 2001, pp. 483507.
  2. H. Suzuki: A generalization of Hilberts theorem 94, Nagoya Math. J., 121 (1991), 191169.
TOP
Yoshio Tanigawa Associate Professor
OFFICE Rm 457 in Bldg. Sci. 1 (internal phone number 2428)
EMAIL tanigawa@math.nagoya-u.ac.jp
RESEARCH
  • analytic number theory
  • zeta function
  • Ramanujans formula
PAPERS
  1. S. Kanemitsu, Y. Tanigawa and M. Yoshimoto: Ramanujans formula and modular forms, in Number Theoretic MethodFuture Trends, (ed. S. Kanemitsu and C. Jia), Kluwer Academic, Dordrecht, 2002, pp. 159212.
  2. Y. Tanigawa: Modular decent of Siegel modular forms of half integral weight and an analogy of the Maass relation, Nagoya Math. J., 102 (1986), 5177.
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Tatsuya Tate Associate Professor
OFFICE Rm 445 (formerly Rm 435) in Bldg. Sci. A (internal phone number 5577)
EMAIL tate@math.nagoya-u.ac.jp
RESEARCH
  • global analysis
  • asymptotic analysis
  • differential geometry
PAPERS
  1. B. Shiffman, T. Tate and S. Zelditch: Distribution laws for integrable eigenfunctions, Ann. Inst. Fourier (Grenoble), 54 (2004), no. 5, 14971546.
  2. T. Tate and S. Zelditch: Lattice path combinatorics and asymptotics of multiplicities of weights in tensor powers, J. Funct. Anal., 217 (2004), no. 2, 402447.
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