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Researcher Information

last modified:2018/04/13

Professor TAMURA Hiroshi


Faculty, Affiliation

Faculty of Mechanical Engineering, Institute of Science and Engineering

College and School Educational Field

Division of Mechanical Science and Engineering, Graduate School of Natural Science and Technology
Division of Innovative Technology and Science, Graduate School of Natural Science and Technology
School of Mechanical Engineering, College of Science and Engineering


 TEL:076-264-6437 FAX:076-264-6437

Academic Background

【Academic background(Doctoral/Master's Degree)】
Hokkaido University Doctor 198503 Completed
【Academic background(Bachelor's Degree)】
Kanazawa University 1977


Year & Month of Birth


Academic Society



Mathematical Physics、、Basic analysis、Mathematical physics/Fundamental condensed matter physics

Speciality Keywords

Statistical Mechanics Random Point Field Quantum Field Theory

Research Themes



  •  Random Point Field Approach to Analysis of Anisotropic Bose-Einstein Condensations H. Tamura and V.A. Zagrebnov Markov Processes Relat. Fields 18 3 473-530 2012/03
  •  Boson Gas Mean Field Model Trapped by Weak Harmonic Potentials in Mesoscopic Scaling B21 163-181 2010/09
  •  Large deviation principle for noninteracting V. Zagrebnov JOURNAL OF MATHEMATICAL PHYSICS 51  023528 2010/02
  •  Mean-field interacting boson random V.A. Zagrebnov JOURNAL OF MATHEMATICAL PHYSICS 50 2  023301 2009/02
  •  Random point fields for paraparticles K.R. Ito JOURNAL OF MATHEMATICAL PHYSICS 48 2 023301 2007/02

show all

  •  A Random Point Field related to K.R. Ito JOURNAL OF FUNCTIONAL ANALYSIS 243 1 207-231 2007/02
  •  A Canonical Ensemble Approach K. R. Ito COMMUNICATIONS IN MATHEMATICAL PHYSICS 263 2 353-380 2006/04
  •  Berezinskii-Kosterlitz-Thouless Order in Two-Dimensional (2)-Ferrofluid JOURNAL OF STATISTICAL PHYSICS 106/5 6 875-8 2002/03
  •  Representations of $, O(N) ,$ Spin Models by Self-Avoiding Random Walks Commun. Math. Phys. 183 3 723-737 1997/02
  •  Note on the Paper `` The Norm Convergence of the Trotter-Kato Product Formula with Error Bound" by Ichinose and Tamura Commun. Math. Phys. 2001 499-510 2001
  •  N Dependence of Upper Bounds of Critical Temperatures of 2D O(N) Spin Models Commun. Math. Phys. 202 127-168 1999
  •  Deviation of Upper Bounds of Critical Temperature of Two-Dimensional O(N) Spin Models Lett. Math. Phys. 44 339-348 1998
  •  A remark on operator-norm convergence of Trotter-Kato product formula Integr. Equ. Oper. Theory 37 3 350-356 2000/02
  •  Dynamics of an Open System for Repeated Harmonic Perturbation Hiroshi Tamura, Valentin A. Zagrebnov Journal of Statistical Physics 163 4 844-867 2016/05
  •  A Model of Nonautonomous Dynamics Driven by Repeated Harmonic Interaction V. A. Zagrebnov, H. Tamura Theoretical and Mathematical Physics 187 3 909-934  2016/06
  •  Dynamical semigroup for unbounded repeated perturbation of an open system Hiroshi Tamura, Valentin A. Zagrebnov Journal of Mathematical Physics 57 2 023519(13pages) 2016/02
  •  Exactly soluble quantum model for repeated harmonic perturbation Hiroshi Tamura, Valentin A. Zagrebnov Journal of Statistical Mechanics:Theory and Experiment 2015 P10005(25 pages) 2015/10

Conference Presentations

Arts and Fieldwork


Theme to the desired joint research

Grant-in-Aid for Scientific Research


Classes (Bachelors)

○Fundamental Physics 1(2017)
○Analysis of Probability and Statistics(2017)
○Fundamental Physics 2(2017)
○Differential and Integral Calculus 2(2017)
○Theory of Vector Analysis and Exercise(2017)
○Theory of Vector Analysis and Exercise(2017)
○Theory of Vector Analysis and Exercise(2016)
○Analysis of Probability and Statistics(2016)
○Basic Literacy for Mathematics and Physics(2016)
○Theory of Vector Analysis and Exercise(2016)
○Fundamental Physics 2(2016)
○Differential and Integral Calculus 2(2016)
○Fundamental Physics 1(2016)

Classes (Graduate Schools)

○Mathematical Physics(2017)
○Mathematical Physics(2017)
○Mathematical Physics(2017)
○Mathematical Physics(2017)
○Master Thesis Report(2016)
○Advanced Course of Mechanical Engineering(2016)

International Project

International Students

Lecture themes

Others (Social Activities)

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