Tohru Eguchi
Born(1948-02-02)February 2, 1948
DiedJanuary 30, 2019(2019-01-30) (aged 70)

Tohru Eguchi (江口 徹, February 2, 1948 – January 30, 2019)[1] was a Japanese theoretical physicist.

Life and career

Tohru Eguchi was a professor at the University of Tokyo, and then at the Yukawa Institute for Theoretical Physics at Kyoto University, of which he was acting director in 2009. From 2012, he was a specially-appointed professor at Rikkyo University. He dealt in particular with differential geometric methods in physics, with Superstring theory, Conformal field theory, Topological quantum field theory, Lattice gauge theory, Quantum gravity, and the Theory of Gravitation.

While at SLAC in 1978, Eguchi and  Andrew J. Hanson discovered an exact Euclidean instanton solution[2] of the vacuum equations of general relativity, the Eguchi–Hanson space metric.[3][4][5] This solution has applications, for example, in the construction of smooth compact Calabi–Yau manifolds in superstring theory.[6]

In the early 1980s, he published an influential and widely cited review article on differential geometric methods in physics with Andrew J. Hanson and Peter Gilkey.[7] They extensively treated the physical applications of the Atiyah-Singer index theorem and related mathematical results.

With Hikaru Kawai, he developed the Eguchi-Kawai model for lattice theories with an SU(N) gauge group in the limit of large N.[8] They showed that in this limit the lattice gauge theory for an infinite lattice and unit cube are identical and that this correspondence can also be maintained in the continuum limit of the lattice.  Spacetime is incorporated in this large N limit as though it were an internal degree of freedom.[9]

Awards

  • Eguchi shared second prize with Hanson in the 1979 Gravity Research Foundation competition.[10]
  • In 1984 he received the Nishina Prize, and in 2009, he received the Imperial Prize and the Prize of the Japanese Academy of Sciences.[11]

References

  1. "Toru Eguchi, Professor Emeritus, The University of Tokyo". asahi.com (in Japanese). 2 February 2019.
  2. A solution of the Einstein equations with self-dual Riemannian curvature tensor and with positive-definite metric (i.e., not a Lorentz metric).  The metric is non-singular and Ricci-flat, and asymptotically it is a locally Euclidean four-dimensional space (ALE, asymptotically locally Euclidean). These metrics are examples of non-compact four-dimensional Hyperkähler manifold.
  3. Eguchi, Hanson (1978). "Asymptotically flat selfdual solutions to Euclidean gravity" (PDF). Physics Letters B. 74 (3): 249–251. Bibcode:1978PhLB...74..249E. doi:10.1016/0370-2693(78)90566-X. OSTI 1446816. S2CID 16380482.
  4. Eguchi, Hanson (1979). "Self-dual solutions to Euclidean Gravity". Annals of Physics. 120 (1): 82–106. Bibcode:1979AnPhy.120...82E. doi:10.1016/0003-4916(79)90282-3. OSTI 1447072. S2CID 48866858.
  5. Eguchi, Hanson (1979). "Gravitational instantons" (PDF). General Relativity and Gravitation. 11 (5): 315–320. Bibcode:1979GReGr..11..315E. doi:10.1007/BF00759271. S2CID 123806150.
  6. Polchinski, Joseph Gerard (2002). String Theory: Superstring Theory and Beyond,Vol.2. Cambridge University Press. p. 309. ISBN 9780521633048. OCLC 910023992.
  7. Eguchi, Gilkey, Hanson (1980). "Gravitation, Gauge Theories and Differential Geometry" (PDF). Physics Reports. 66 (6): 213–393. Bibcode:1980PhR....66..213E. doi:10.1016/0370-1573(80)90130-1.{{cite journal}}: CS1 maint: multiple names: authors list (link)
  8. Eguchi, Tohru; Kawai, Hikaru (1982-04-19). "Reduction of Dynamical Degrees of Freedom in the Large-$N$ Gauge Theory". Physical Review Letters. 48 (16): 1063–1066. Bibcode:1982PhRvL..48.1063E. doi:10.1103/PhysRevLett.48.1063.
  9. Makeenko, Yuri (2002). Methods of Contemporary Gauge Theory by Yuri Makeenko. doi:10.1017/CBO9780511535147. ISBN 9780511535147. {{cite book}}: |website= ignored (help)
  10. "Gravity Research Foundation". Gravity Research Foundation.
  11. "Prof. Tohru Eguchi Receives Imperial Prize & Japan Academy Prize 2009 - School of Science, the University of Tokyo". www.s.u-tokyo.ac.jp.
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