Download or read book On Hilbert Modular Surfaces Which Are of the General Type written by Tsz-On Mario Chan and published by Open Dissertation Press. This book was released on 2017-01-27 with total page pages. Available in PDF, EPUB and Kindle. Book excerpt: This dissertation, "On Hilbert Modular Surfaces Which Are of the General Type" by Tsz-on, Mario, Chan, 陳子安, was obtained from The University of Hong Kong (Pokfulam, Hong Kong) and is being sold pursuant to Creative Commons: Attribution 3.0 Hong Kong License. The content of this dissertation has not been altered in any way. We have altered the formatting in order to facilitate the ease of printing and reading of the dissertation. All rights not granted by the above license are retained by the author. Abstract: Abstract of thesis entitled ON HILBERT MODULAR SURFACES WHICH ARE OF THE GENERAL TYPE submitted by Chan Tsz On Mario for the degree of Master of Philosophy at The University of Hong Kong in November 2007 Compact Riemann surfaces are classified according to their genera. For a surface of genus>= 2, the uniformization theorem says that it is a quotient Γ\∆ of the unit disc ∆ by a discrete subgroup Γ of Aut(∆), acting freely on ∆. In general, the quotient Γ\∆ for an arbitrary dis- crete subgroup Γ∈ Aut(∆) is considered. It is equivalent to consider X = Γ\H, where H is the upper half plane and Γ a discrete subgroup ofAut(H) =PSL (R). Thisspacecanbegivenastructureofmanifold, but may not be compact in general. When Γ is a subgroup commensu- rable withPSL (Z), X is called a modular curve. There is a procedure to compactify X by adding finite number of points, and the resultinge spaceX canbegiventhestructureofacompactRiemannsurface. The properties of X can be studied according to the genus of X. In the theory of compact complex surfaces, there is a rough clas- sification according to the Kodaira dimensions. A surface of Kodaira dimension 2 is called a surface of general type and is analogous to the Riemann surfaces of genus>= 2. Parallel to modular curves, one would study the quotient of HH by a discrete group commensurable with a Hilbert modular groupPSL (o ), where o is the ring of integers of 2 K K a real quadratic field K overQ. These spaces are called Hilbert modu- lar surfaces. PSL (o ) is irreducible, i.e. whenPSL (K) is embedded 2 K 2 into PSL (R)PSL (R), the image of PSL (o ) under each projec- 2 2 2 K tion is dense in PSL (R). Therefore the Hilbert modular surfaces are not simply products of modular curves. There is also a procedure to compactify such quotients by adding finite number of points. Contrary to the case of modular curves, the compact spaces thus obtained are highly singular. Hirzebruch gave a procedure to desingularize them. As a result, Hilbert modular surfaces can be studied using theory of compact complex surfaces. Hilbert modular surfaces have a deep rootin number theory. Because of this nature, one can calculate explic- itly the geometric invariants of them in terms of algebraic parameters. Their types according to the rough classification can then be found. This thesis aims at demonstrating how a Hilbert modular surface can be identified to be of general type. To provide necessary back- ground of the one-dimensional theory, it presents the basic theories of compactRiemannsurfacesandmodularcurvesindetail, andillustrates how the theory of compact Riemann surfaces can be applied to study modular curves. Hilbert modular surfaces were then introduced as an analogue of modular curves. Hirzebruch's procedure of desingulariza- tion was described. Analogous to the one-dimensional cases, the application of the the- ory of compact complex surfaces to Hilbert modular surfaces was illus- trated by demonstrating how the geometric invariants of the surfaces canbecalculatedfromthealgebraicparameters. Attheendofthethe- sis, a sufficient condition for a Hilbert modular surface to be of general type was given. DOI: 10.5353/th_b3955766 Subjects: Hilbert modular surfaces