This is a preview of subscription content, log in via an institution to check access.
References
S. Altman and S. Kleinman. Introduction to Grothendieck Duality Theory.
S. Bloch. Cycles of Arithmetic Schemes and Euler-characteristics on Curves. Proc. Sympos. Pure Math.46 (1987), 421–450.
A. Grothendieck and J. Dieudonné. Eléments de Géometrie Algébrique IV. Publ. IHES32 (1967).
W. Fulton. Intersection Theory. Springer 1984.
W. Fulton. Hurwitz Schemes and Irreducibility of Moduli of Algebraic Curves. Ann. of Math.90 (1969), 542–575.
T. Höfer. Geradenkonfigurationen und algebraische Flächen. Max-Planck-Inst. für Mathematik, Bonn. Vieweg, 1987.
P. Hriljac. The Néron-Tate Height and Intersection Theory on Arithmetic Surfaces. Thesis 1982. MIT.
B. Iversen. Numerical Invariants and Multiple Planes. Amer. J. Math.92 (1970), 968–996.
S. Lang. Introduction to Arakelov Theory. Springer, 1988.
S. Lichtenbaum. Curves over Discrete Valuation Rings. Amer. J. Math.25 (1968), 380–405.
J.S. Milne. Etalé Cohomology. Princeton, 1980.
A.N. Parshin. Minimal Model of Curves of Genus 2 and Homomorphisms of Abelian Varieties Defined over a Field of Finite Characteristic. Math. USSR Izv.6 (1972), 65–108.
A.N. Parshin. The Bogomolov-Miyaoka-Yau Inequality for the Arithmetical Surfaces and its Applications. Sém. de Théorie de Nombres, Paris, 1986-87, 299–311.
Q.V. Pham. Zur Rolle der Chern-Klassen in der Arakelovschen arithmetischen Geometrie. Thesis 1992. Univ. Hamburg.
Author information
Authors and Affiliations
Rights and permissions
About this article
Cite this article
Pham, Q.V. An arithmetic Hurwitz formula. Abh.Math.Semin.Univ.Hambg. 64, 51–58 (1994). https://doi.org/10.1007/BF02940774
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF02940774