MATH 431
Algebraic Geometry

Ali Sinan Sertöz
Faculty of Science, SA-Building, Department of Mathematics, Room 121
Phone: 1490


Schedule:
TUE 13:30-15:20 SA-Z03
FRI  08:30-10:20 SA-Z03

General Notes:
I have given several Math 431 courses in the past, and no two were alike!
You may browse a list of these courses at this link.

This time I plan to merge the algebraic and complex analytic aspects of geometry as follows:

The beginnings of algebraic geometry lie in the theory of Riemann Surfaces which are complex curves. Most of the powerful tools of higher dimensional algebraic geometry take their inspiration from what Riemann did with curves.

We will thus combine the general tools of algebraic geometry with their applications to the specific subject of complex curves.

One of the mind blowing results of complex curve theory is that the abstractly defined compact complex Riemann surfaces can all be realized as concrete algebraic varieties which are solution sets of polynomials only, no other complex analytic functions are involved contrary to what we were expecting.

To appreciate the staggering beauty of such results we must develop a language which will both help us to talk about such objects without ambiguity and also help us to understand why such results are unexpected, beautiful and exciting.

Main Textbook: Robin Hartshorne, Algebraic Geometry, Springer-Verlag, 1977.

Auxiliary Textbook: Phillip Griffiths, Introduction to Algebraic Curves, American Mathematical Society, 1989

From the first book we will learn the general techniques and approach and from the second book we will see how these ideas apply to curves.

Highlights of the course will include:

• Bezout's Theorem: Two plane curves of degrees m and n intersect in exactly mn points.  If you see less than that many points then some of the intersection points are at infinity. We need to develop a language to control what happens at infinity. That is why we will first develop a theory of projective spaces.
• Riemann-Roch Theorem: You can control the number of functions on a curve and thus find enough number of functions to embed a curve into a projective space. This is totally unexpected but true! And once you are in projective space then you have only polynomials!! This is due to a deep theorem of Serre which goes by the funny name GAGA.
• On a surface of degree three there are exactly 27 lines, no matter which cubic surface you take. But on a generic surface of higher degree there are no lines at all. Some surfaces however have some lines and the possible number of lines a surface can hold is an on going active research area. (see for example this paper.)
  
• Time permitting I will briefly introduce the ideas around Arf rings and Arf closures which are related to the understanding of singular, bad, points of a curve. (see for example this paper.)
  

I will mainly follow the syllabus given on STARS with occasional deviations to cover more interesting topics.

Grading: I will follow the midterm and homework requirements as announced in STARS.

Letter Grades:

The course will be graded according to  the following catalogue:

[0,34)	F
[34,40)	D
[40,44)	D+
[44,50)	C-
[50,55)	C
[55,59)	C+
[59,63)	B-
[63,65)	B
[65,70)	B+
[70,75)	A-
[75,100]	A

FZ Requirement: Less than 50% attendance and/or less than 35% average from the midterms may result in an FZ grade.
(Statistically we know that students whose midterm averages are low never write a good final exam paper which will make their letter grade above F.)

Exams and Homework

Midterm 1	30%	01 April 2022 Friday	Solution
Midterm 2	30%	06 May 2022 Friday	Solution
Homework 1	1%	04 March 2022	Solution
Homework 2	1%	08 April 2022 Friday	Solution
Homework 3	1%	15 April 2022 Friday	Solution
Homework 4	1%	22 April 2022 Friday	Solution
Homework 5	1%	29 April 2022 Friday	Solution
Final	35%	20 May 2022 Friday	Solution