Advances in the theory of Riemann surfaces : proceedings of the 1969 Stony Brook conference
edited by Lars V. Ahlfors ... [et al.].
Princeton, N.J. : Princeton University Press, 1971.
viii, 420 págs. ; 24 cm.
Serie: Annals of mathematics studies ; no. 66
ISBN: 069108081X
Incluye referencias bibliográficas.
Reseña: MathSciNet, 43 #5023
Contenido
- W. Abikoff, Some remarks on Kleinian groups; R. D. M. Accola, Vanishing properties of theta functions for abelian covers of Riemann surfaces (unramified case); L. V. Ahlfors, Remarks on the limit point set of a finitely generated Kleinian group; L. Bers, Extremal quasiconformal mappings; L. Bers and L. Greenberg, Isomorphisms between Teichmüller spaces; J. S. Birman and H. M. Hilden, On the mapping class group of closed surfaces as covering spaces; P. L. Duren, Schwarzian derivatives and mappings onto Jordan domains; C. J. Earle, On the moduli of closed Riemann surfaces with symmetries; L. Ehrenpreis, An eigenvalue problem for Riemann surfaces; H. M. Farkas, Relations between quadratic differentials; F. Gardiner, Deformations of embeddings of Riemann surfaces in projective space; F. W. Gehring, Lipschitz mappings and the $p$-capacity of rings in $n$-space; W. J. Harvey, Spaces of Fuchsian groups and Teichmüller theory; L. Keen, On Fricke moduli; I. Kra, Eichler cohomology and the structure of finitely generated Kleinian groups; A. Lebowitz, On the degeneration of Riemann surfaces; J. Lewittes, Singular Riemann matrices; A. Marden, An inequality for Kleinian groups; B. Maskit, On Klein's combination theorem. III; B. O'Byrne, On Finsler geometry and applications to Teichmüller spaces; K. V. Rajeswara Rao, Reproducing formulas for Poincaré series of dimension -2 and applications; H. E. Rauch, Period relations on Riemann surfaces; H. E. Rauch, Schottky implies Poincaré; E. Reich and K. Strebel, Teichmüller mappings which keep the boundary pointwise fixed; H. L. Royden, Automorphisms and isometries of Teichmüller surfaces; R. A. Rüedy, Deformations of embedded Riemann surfaces; I. Satake, Fock representations and theta-functions; R. J. Sibner, "Uniformizations" of infinitely connected domains.