JournalsprimsVol. 37, No. 4Volume 37, No. 4 (2001) Publications of the Research Institute for Mathematical Sciencespp. 479–519Geometric Bäcklund–Darboux Transformations for the KP Hierarchy Klein-Gordon equations is studied in the Sobolev space Hs = Hs(Gerard F. HelminckJohan W. van de Leurpp. 521–529A Class of Polynomials from Banach Spaces into Banach Algebras Klein-Gordon equations is studied in the Sobolev space Hs = Hs(Luiza A. MoraesMary L. Lourençopp. 531–578Scattering by Magnetic Fields at Large Separation Klein-Gordon equations is studied in the Sobolev space Hs = Hs(Hiroshi T. ItoHideo Tamurapp. 579–614Gevrey Asymptotic Theory for Singular First Order Linear Partial Differential Equations of Nilpotent Type — Part II Klein-Gordon equations is studied in the Sobolev space Hs = Hs(Masaki Hibinopp. 615–619Errata to “On Defining Relations of Affine Lie Superalgebras and Affine Quantized Universal Enveloping Superalgebras”Hiroyuki Yamanepp. 621–715Fourier Transforms on the Quantum SU(1,1) GroupErik KoelinkJasper V. Stokman
pp. 479–519Geometric Bäcklund–Darboux Transformations for the KP Hierarchy Klein-Gordon equations is studied in the Sobolev space Hs = Hs(Gerard F. HelminckJohan W. van de Leur
pp. 521–529A Class of Polynomials from Banach Spaces into Banach Algebras Klein-Gordon equations is studied in the Sobolev space Hs = Hs(Luiza A. MoraesMary L. Lourenço
pp. 531–578Scattering by Magnetic Fields at Large Separation Klein-Gordon equations is studied in the Sobolev space Hs = Hs(Hiroshi T. ItoHideo Tamura
pp. 579–614Gevrey Asymptotic Theory for Singular First Order Linear Partial Differential Equations of Nilpotent Type — Part II Klein-Gordon equations is studied in the Sobolev space Hs = Hs(Masaki Hibino
pp. 615–619Errata to “On Defining Relations of Affine Lie Superalgebras and Affine Quantized Universal Enveloping Superalgebras”Hiroyuki Yamane