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Mathematics

[1921] C=2 Rational Toroidal Conformal Field Theories via the Gauss Product

Shinobu Hosono University of Tokyo Bong H. Lian Brandeis University Keiji Oguiso University of Tokyo Shing-Tung Yau Harvard University

Metric Geometry mathscidoc:1608.23001

Communications in Mathematical Physics , 241, 245-286, 2003

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[1922] Notes on the diophantine equation$y$^{2}−$k$=$x$^{3}

Ove Hemer

TBD mathscidoc:1701.332095

Arkiv for Matematik, 3, (1), 67-77, 1954.3

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[1923] Application de la théorie des équations intégrales linéaires aux systèmes d'équations différentielles non linéaires

Torsten Carleman Stockholm

TBD mathscidoc:1701.33789

Acta Mathematica, 59, (1), 63-87, 1932.12

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[1924] Special functions on locally compact fields

P. J. Sally Jr. Washington University, St. Louis, Mo., USA M. H. Taibleson Washington University, St. Louis, Mo., USA

TBD mathscidoc:1701.331309

Acta Mathematica, 116, (1), 279-309, 1965.8

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[1925] Lyapunov exponents for random perturbations of some area-preserving maps including the standard map

Alex Blumenthal University of Maryland-College Park Jinxin Xue University of Chicago Lai-Sang Young Courant institute of mathematical sciences, New York University

Dynamical Systems mathscidoc:1703.11002

Distinguished Paper Award in 2017

Annals of Mathematics, 185, (1), 285-310, 2017.1

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Mathematics

[1921] C=2 Rational Toroidal Conformal Field Theories via the Gauss Product

Shinobu Hosono University of Tokyo Bong H. Lian Brandeis University Keiji Oguiso University of Tokyo Shing-Tung Yau Harvard University

Metric Geometry mathscidoc:1608.23001

[1922] Notes on the diophantine equation$y$^{2}−$k$=$x$^{3}

Ove Hemer

TBD mathscidoc:1701.332095

[1923] Application de la théorie des équations intégrales linéaires aux systèmes d'équations différentielles non linéaires

Torsten Carleman Stockholm

TBD mathscidoc:1701.33789

[1924] Special functions on locally compact fields

P. J. Sally Jr. Washington University, St. Louis, Mo., USA M. H. Taibleson Washington University, St. Louis, Mo., USA

TBD mathscidoc:1701.331309

[1925] Lyapunov exponents for random perturbations of some area-preserving maps including the standard map

Alex Blumenthal University of Maryland-College Park Jinxin Xue University of Chicago Lai-Sang Young Courant institute of mathematical sciences, New York University

Dynamical Systems mathscidoc:1703.11002

Distinguished Paper Award in 2017

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