Kazuyuki Hatada

Title:  Mathematician

Company:  Gifu University

Location:  Gifu, Japan

Achievements:

  • Inductee, Albert Nelson Marquis Lifetime Achievement (2017)
  • Obtained the 10 New Congruences Enjoyed by All the Eigenvalues of Hecke Operators on SL(2,Z)
  • Obtained that the Hecke Rings as Representations Act Naturally on the Integral and l-adic Cohomology Groups of Suitable Smooth Projective Toroidal Compactifications of the Higher Dimensional Modular Varieties through Correspondences, and Investigated Properties on This
  • Author, Study of Hecke Correspondences and Cohomology Groups on Compactified Higher Dimensional Modular Varieties and Schemes
  • Obtained that Any Modular Form of Nebentypus of Level Np^m Is a p-Adic Modular Form of Level N
  • Obtained the New Expressions of the Local Zeta Functions of the Compactified Hilbert Modular Schemes in Terms of the Action of the Hecke Rings
  • Author, Study of p-Adic Modular Forms, (mod p) Modular Forms and p-Adic L Functions
  • Author, Study of p-Adic Interpolations of Values of Dirichlet Series and p-Adic Properties of Arithmetic Numbers
  • Author, Study of Fermat and Fibonacci Quotients and Values of Zeta Functions at 2-p
  • Author, Study of Parabolic Cohomology Groups, Spaces of Periods for Elliptic Cusp Forms of Arbitrary Levels and Arbitrary Weights >1, Ratios of Periods of Any Primitive Elliptic Cusp Form, and Congruences Satisfied by All the Eigenvalues of Hecke Operators Acting on Elliptic Cusp Forms of Some Small Levels and Arbitrary Weights>1
  • Obtained Simple Proofs of Isochronism of Cycloidal Pendulum
  • Author, Study of Inequalities on Several Real Variables
  • Author, Study of Limits of Recursive Sequences of Means for Several Numbers
  • Obtained New Means for k Positive Numbers with Any k>2, That Extend the Arithmetic-Geometric Mean of Gauss for k=2
  • Author, Study of Euclidean Geometry of n-Simplexes
  • Obtained, without Any Artificial Definition, that the Set {0, 1, 2, 3, … } of All the Natural Numbers Produces All the Rational Integers That Have Structure of Integral Domain. From This, Proved That the Product of Two Negative Integers Must Be Positive
  • Obtained, without Any Artificial Definition, the Field of Rational Numbers (Respectively Ring of Fractions) from the Set of All the Natural Numbers (Respectively Any Commutative Ring)
  • Obtained, for Any Odd Prime Number p, Such Infinite Integral Sequences Resembling Fermat Sequence {2^(2^n)+1 | n = 0, 1, 2, 3, … } That Arbitrary Two Terms of Any Sequence in Them Are Relatively Prime
  • Characterized Siegel Cusp Forms as Holomorphic Differential Forms on Certain Compact Varieties
  • Obtained New Sharp Estimates for All the Eigenvalues of Hecke Operators on Siegel Cusp Forms
  • Author, “Hecke Operators and Systems of Eigenvalues on Siegel Cusp Forms” (Submitted in 2014 and 2015, Accepted on October 21, 2017)
  • Recipient, Insignia of Dedications, Cambridge (1988)
  • Honoree, International Cultural Diploma of Honor, ABI (1988)
  • Recipient, Silver Medal (1989)
  • Recipient, Gold Medal for 1st 500 (1990)
  • Honoree, International Order of Merit, IBC (1990)
  • Recipient, International Man of the Year Award (1991-1992, 1995-1996)
  • Recipient, 20th Century Award for Achievement (1993)
  • Recipient, Global Distinction Award 1994-1995, IBRI/IIRB (June 11, 1995)
  • Recipient, Golden Scroll of Excellence (1997)
  • Recipient, American Medal of Honor (2002)
  • Honoree, Lifetime Achievement Award for Contributions to Generalized Ramanujan Conjecture, World Congress of Arts, Sciences, Communications, Chairman: C. Emett, FRS (2005)
  • Recipient, Archimedes Award (2006)
  • Recipient, Man of the Year (2000)
  • Recipient, International Personality of the Year (2001)
  • Recipient, International Scientist of the Year Award (2002)
  • Honoree, Top 100 Scientists, IBC (2005)
  • Honoree, Director General’s Roll of Honor, for contributions to The Generalized Ramanujan Conjecture in Math (2007)
  • Listee, Worldwide Honors List, Number Theory of Siegel Cusp Forms (2003)
  • Honoree, Greatest Lives (2008)
  • Honoree, Albert Einstein International Academy Foundation (1998)
  • Featured Listee, Who’s Who in America, Marquis Who’s Who (2007-2010)
  • Featured Listee, Who’s Who in Asia, Marquis Who’s Who (2007)
  • Featured Listee, Who’s Who in Science and Engineering, Marquis Who’s Who (1992-2009)
  • Featured Listee, Who’s Who in the World, Marquis Who’s Who (1987-2008, 2010)
  • Honoree, Universal Proclamation of Excellence, for proving that in any degree there are infinitely many Siegel cusp eigenforms satisfying Generalized Ramanujan Conjecture, IBC (March 5, 2015)
  • Honoree, The Sir Isaac Newton Legacy of Honour Award, for proving the Generalized Ramanujan Conjecture (2016)
  • Honoree, World Leader of the Sciences -2016- , for proving the Generalized Ramanujan Conjecture, IBC (December 14, 2016)
  • Honoree, Honorary Professor of Science, for services to Number Theory and Modular Forms, IBC (January 31, 2017)
  • Honoree, Top 100 Scientists, IBC (February 20, 2017)
  • Honoree, International Scientist of the Year 2017, for proving the Generalized Ramanujan Conjecture, (May, 2017)

Designations: 

  • DSc (Rigaku Hakushi in Japan), The University of Tokyo
  • MS, The University of Tokyo
  • BS, The University of Tokyo

 

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