There are several equivalent definitions of a riemann surface. Following our work in 18, we prove a gluing formula for the donaldson invariants. Links between riemann surfaces and algebraic geometry. In the normal form of a finite riemann surface, the number of sides is not necessarily even, some sides corresponding to components of the boundary that remain free are not identified. A compact riemann surface of genus, or is a riemann surface of elliptic, parabolic or hyperbolic type, respectively. Complex analysis on riemann surfaces download book. Research current work phd thesis articles master thesis extras history papers courses own work conferences links contact home. Download course materials all images created with matlab software click on picture for more information and an image of higher resolution. Riemann surfaces are central in mathematics because of the multiple connections between complex analysis, algebraic geometry, hyperbolic geometry, group theory, topology etc. Riemannian surfaces are riemann surfaces metrics on surfaces. This means that x is a connected hausdorff space that is endowed with an atlas of charts to the open unit disk of the complex plane. A riemann surface x is a connected complex manifold of complex dimension one. Algebraic geometry and riemann surfaces daniel ying abstract.
His main result is that all compact complex one manifolds occur as the riemann surface of an algebraic curve. Donaldson invariants of product ruled surfaces and two. In this thesis we will give a present survey of the various methods used in dealing with riemann surfaces. By focusing on low dimensions, donaldson bridges the gap between elementary complex variables and the deeper topics of complex manifolds, cohomology, algebraic topology, vector bundles, sheaves and so forth.
In mathematics, particularly in complex analysis, a riemann surface is a onedimensional complex manifold. I guess that you, my imaginary reader, have stopped reading all of this nonsense. Ok, so the purpose of this page is to give some of my papers and. Chapter 3 geometry of riemann surfaces sciencedirect. The books we will be using as reference for this course are farkas and kra riemann surfaces and donaldsons riemann surfaces the lectures will take place on wednesdays from 14. What is, in basic terms, the relationship between riemann surfaces and algebraic geometry.
In the case of riemann surfaces a direct proof for arbitrary rank which avoids introduction of the donaldson functional can be modeled on donaldsons proof of the narasimhanseshadri theorem in 18 such a proof was suggested in 57. George springer, introduction to riemann surfaces jenkins, james a. The course begins by introducing the notion of a riemann surface followed by examples. Riemann in 1851 for the purpose of replacing the study of multiplevalued analytic functions by the study of singlevalued analytic functions of a point on corresponding riemann surfaces seeanalytic functions. Im taking introductory courses in both riemann surfaces and algebraic geometry this term.
Prime riemann surface theta function form function. The paragraphs in small print are intended for interest. It also deals quite a bit with noncompact riemann surfaces, but does include standard material on abels theorem, the abeljacobi map, etc. Another excellent analytic monograph from this point of view is the princeton lecture notes on riemann surfaces by robert gunning, which is also a good place to learn sheaf theory. Riemann surfaces oxford graduate texts in mathematics series by simon donaldson. Given two riemann surfaces with boundary and a homotopy class of topological embeddings between them, there is a conformal embedding in the homotopy class if and only if the extremal length of. Arakelov invariants of riemann surfaces 3 other hand the set picg.
Then the classification of riemann surfaces is achieved on the basis of the fundamental group by the use of covering space theory and uniformisation. We state a general conjecture about the existence of kahler metrics of constant scalar curvature, and discuss the background to the conjecture 1. On gonality of riemann surfaces city university of new york. These are notes on the theory of super riemann surfaces and their moduli spaces, aiming to collect results that are useful for a better understanding of superstring perturbation theory in the rns formalism. The main idea of the proof is to show that a certain moduli space of pu2instantons on a surface x with no curves if such a surface existed would contain a closed riemann surface y whose. Riemann surface article about riemann surface by the free. Vector bundles on riemann surfaces sabin cautis contents 1. Riemann surfaces, dynamics amd geometry researchgate.
This expression generalizes a theorem of morgan and szabo for g1 to any genus g. This is an introduction to the geometry of compact riemann surfaces, largely following the books farkaskra, fay, mumford tata lectures. The picture shows only three levels of the surface, which extends up and down with infinitely many similar levels all joined at the branch point at the origin. Riemann surfaces were first studied by bernhard riemann in his inauguraldissertation at gottingen in 1851. It is an extremely useful part of mathematics, knowledge of which is needed by specialists in many other fields. These surfaces were first studied by and are named after bernhard riemann.
So the core of this paper is the material of sections 3 and 4 where the yangmills theory is extended to riemann v surfaces or riemann surfaces with marked points and then applied to give information on the moduli spaces. Seibergwitten monopole equations and riemann surfaces. In this paper we study a class of riemann hilbert problems arising naturally in donaldson thomas theory. The square root provides another simple example of a riemann surface. Ok, so the purpose of this page is to give some of my papers and other work some easy accessibility on the webb. The complex line c has an obvious structure of riemann surface given by the chart c,idc.
Use features like bookmarks, note taking and highlighting while reading riemann surfaces oxford graduate texts in mathematics book 22. This case of the narasimhanseshadri theorem says that a degree zero holomorphic vector bundle over a riemann surface is stable if and only if it comes from an irreducible unitary representation of the fundamental group of the riemann surface. Complex analysis is a cornerstone of mathematics, making it an essential element of any area of study in graduate mathematics. Gluing formulae for donaldson invariants for connected sums along surfaces vicente munozt abstract. We also give a criterion in terms of the continuous linear functionals on the space bd that a riemann surface be hyperbolic theorem 4. Download course materials all images created with matlab software infinite spiral staircaselike riemann surface for the logarithm. Finite riemann surfaces are topologically completely characterized by the genus, and the number of connected components of the boundary. Riemann surfaces university of california, berkeley. Mean curvature flows in manifolds of special holonomy tsai, chungjun and wang, mutao, journal of differential geometry, 2018. A remark on universal coverings of holomorphic families of riemann surfaces imayoshi, yoichi and nishimura, minori, kodai mathematical journal, 2005. Algebraic functions 11 let pz,w be a polynomial in two complex variables.
Citeseerx document details isaac councill, lee giles, pradeep teregowda. They involve maps from the complex plane to an algebraic torus, with prescribed discontinuities along a collection of rays, and are closely related to the riemann hilbert problems considered by gaiotto et al. Harmonic functions on open riemann surfaces 41 linna, or if it does not have a greens function, then it is parabolic. Riemannhilbert problems from donaldsonthomas theory. Riemann surface pdf 1 riemann surfaces and holomorphic maps. The minicourse is dedicated to master students having. The open set u is called the domain of the chart c. Basic idea of riemann surface theory is to replace the domain of a. X there is a neighbourhood of x that is homeomorphic to the open unit disk of the complex plane, and.
It is particularly pleasing that the subject of riemann surfaces has attracted the attention of a new generation of mathematicians from newly adjacent fields for example, those interested in hyperbolic manifolds and iterations of rational maps and young physicists who have been convinced certainly not by mathematicians that compact. Open and closed surfaces are treated with emphasis on the compact case, while basic tools are developed to describe the analytic, geometric, and algebraic properties of riemann surfaces and the associated abelian varities. Part iid riemann surfaces dr alexei kovalev notes michaelmas 2007 these notes are a bit terse at some points and are not intended to be a replacement for the notes you take in lectures. Riemann surfaces oxford graduate texts in mathematics book 22 kindle edition by donaldson, simon. Seifert fibred homology 3spheres and the yangmills. Pages in category riemann surfaces the following 52 pages are in this category, out of 52 total. Riemann surfaces can be thought of as deformed versions of the complex plane. Donaldson gave another proof using differential geometry, and showed that the stable vector bundles. The set of all divisors on xforms an abelian group denoted. Could you recommend some references, and point out the required mathematical knowledge. Thursday, october 14, 2010 week 41 this week we started our study of calculus on riemann surfaces. The topis is wide and well described in literature, so our aim was to bring some avour of it. The theory of riemann surfaces occupies a very special place in mathematics.
Riemann surface article about riemann surface by the. Cfrom a riemann surface minto cis called a holomorphic function on m. The book we will be using as reference for this course is donaldsons preprint riemann surfaces, available soft bound from bbl. The equations in this article we discuss some wellknown problems in kahler geometry. Riemann surfaces graduate texts in mathematics graduate.
Prove the existence of the universal covering of a connected manifold x, and remark that in case xis a riemann surface, its universal covering is a riemann surface as well for91, i. Basic properties of complex numbers, complex differentiability, conformality, contour integration, zeros and poles, application to evaluation of definite real integrals, local and global properties, convergence in function theory, dirichlets problem, periodic functions. Contents i preliminaries 7 1 holomorphic functions 9. A divisor is an expression x x2x a xx where the coe cients a x are integers, and only a nite number of them are nonzero. Sep 29, 2014 jacob bernsteins series of 10 lectures on riemann surfaces from the msri summer graduate school on geometry and analysis that took place at msri, berkeley in julyaugust, 2014. However, while its possible to sort of talk about a manifold in laymans english, the distinction between riemann surfaces and 2manifolds is very subtle and difficult to describe without using any math. A fundamental theorem of abeljacobi riemann says that there is a canonical. The general theme is to ask whether a complex manifold admits a preferred. Download it once and read it on your kindle device, pc, phones or tablets. For riemann surfaces, a choice of almost complex structure is equivalent to a choice of complex structure.
Riemann surfaces oxford graduate texts in mathematics. Many profound results concerning the famous moduli problem can be reduced t. It is extremely wellwritten, but definitely more analytic in flavor. However, his riemann surface is also a riemann surface of a square root function albeit one with a more complicated form than the core w z 12 example and, hence, he also wraps it up as a donut indeed, instead of a sphere or something else. In higher dimensions, an almost complex structure is a pre requisite to the existence of a complex structure. This is an outstanding introduction to the modern study of riemann surfaces. The topis is wide and well described in literature, so our aim was to bring some avour. It is a culmination of much of traditional calculus, making surprising conne. I was surprised to hear that any compact riemann surface is a projective variety.
This text covers riemann surface theory from elementary aspects to the fontiers of current research. It is an extremely useful part of mathematics, knowledge of which is. Coverings of riemann surfaces and the universal covering study proper nonconstant holomorphic maps between riemann surfaces for91, 4. If you find any typos, please let me know as i will be passing this information on to the author. The pictures here show two views of this surface, whose construction is explained next. Orientability of riemann surfaces will follow from our desire to do complex analysis on them. One naturally encounters holomorphic functions in various ways. Some proofs are not included, but can be chased via the given page references to textbooks. Buy riemann surfaces oxford graduate texts in mathematics 1st edition by donaldson, simon isbn. In particular, it includes pretty much all the analysis to prove finitedimensionality of sheaf cohomology on a compact riemann surface. A nonsingular riemann surface s in c2 is a riemann surface where each point z0. If x is a compact riemann surface and x admits any nontrivial automorphism, then x. Department of pure mathematics and mathematical statistics, university of cambridge.
It is a culmination of much of traditional calculus, making surprising connections with geometry and arithmetic. A simplyconnected riemann surface of parabolic type is necessarily the riemann surface of the function inverse to a meromorphic function in the finite plane. Donaldson theory on nonk\ahlerian surfaces and class. These are fourmanifolds of the form g s2,where gis a riemann surface of genus g. Curvature of higher direct image sheaves geiger, thomas and schumacher, georg, 2017. In 6, a direct application of the lattice reduction technique of 3 led to explicit expressions for the donaldson invariants of these surfaces, in the chamber where the volume of s2 is. Wednesday, may 9, 2012 week 19 this lecture we learnt the riemann hurwitz formula and used it to draw some consequences about non existence of maps between riemann surfaces. Schlags treatment of the subject emphasizes the intuitive geometric underpinnings of elementary complex analysis that naturally lead to the theory of riemann surfaces. This reduces the study of riemann surfaces to that of subgroups of moebius transformations. In the second half of the lecture, we started our study of the blowup of points in a complex surface, by explaining the blowup of c2 at the origin.
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