Dokuz Eylül University Information Package / Courses Catalog

Description of Individual Course Units

Course Unit Code	Course Unit Title	Type Of Course	D	U	L	ECTS
MAT 4043	ELEMENTARY ALGEBRAIC GEOMETRY	ELECTIVE	4	0	0	7

Offered By

Mathematics

Level of Course Unit

First Cycle Programmes (Bachelor's Degree)

Course Coordinator

ASSISTANT PROFESSOR CELAL CEM SARIOĞLU

Offered to

Mathematics (Evening)
Mathematics

Course Objective

This course will introduce the basic objects in algebraic geometry: afine and projective varieties, and the maps between them. The focus will be on explicit concrete examples.

Learning Outcomes of the Course Unit

1	will be able to give the definitions of an affine and a projective varieties
2	Will be able to express the relation between algebraic varieties, ideals and coordinate rings in both affine and projective cases
3	will be able to calculate the singular points and the dimension of algebraic varieties
4	will be able to calculate the genus of a curve
5	will be able to resolve simple singularities via blow-ups

Mode of Delivery

Face -to- Face

Prerequisites and Co-requisites

None

Recomended Optional Programme Components

None

Course Contents

Week	Subject	Description
1	Affine and Projective spaces, Unit circle as a motivation for rational curves, rational curves, Conics and easy cases of Bézout s theorem
2	Cubics and the group law, Pascal s mystic hexagon, Curves and their genus
3	Noetherian rings, Hilbert basis theorem
4	Noether normalization, Zariski topology, Nullstelensatz
5	Regular functions and regular maps, product of affine varieties
6	Irreducible algebraic subsets, Rational functions, Rational maps, Birational maps
7	Projective variety, Projective Nullstellinsatz, Morphisms of projective varieties
8	Midterm
9	Quadratics, Veronese varieties, Quasiprojective varieties and morphisms
10	Grassmannian variety, Product of varieties, Segre embedding
11	Nonsingular points of a hypersurface, Tangent space, Dimension
12	Dimension of intersection with a hypersurface, Blow-up in afine space, Blow-up in projective space
13	Resolution of singularities
14	Lines on surfaces

Recomended or Required Reading

1. Reid,M., Undergraduate Algebraic Geometry, Cambridge University Press, 1989, ISBN 978-0521356628
Supplementary Books:
2. Fulton, W., Algebraic Curves: an intr. to algebraic geometry, Addison Wesley, 1989, ISBN 978-0201510102
3. Shafarevich, I. R., Basic Alg Geo I, 2nd ed., Springer, 1994, ISBN 978-3540548126
4. Cox, D., Little, J., O shea D., Ideals, Varieties and Algorithms: an introduction to computational algebraic geometry and commutative algebra, 3rd ed., Springer, 2007, ISBN 978-0387356509
5. Gibson, C.G., Elementary Geometry of Algebraic Curves, Cambridge University Press, 1999, ISBN 978-0521641401
6. Brieskorn, E., Knörrer, H., Plane Algebraic Curves, Birkhauser, 1986, ISBN 978-3764317690
References:
7. Hartshorne, R. Algebraic Geometry, Springer, 1977, ISBN 978-0387902449
8. Eisenbud, D., Commutative Algebra with a View Toward Algebraic Geometry, Springer, 1995, 978-0387942698
9. Hauser, H.,Seven short stories on blow-ups and resolutions,International Press,

Planned Learning Activities and Teaching Methods

Assessment Methods

SORTING NUMBER	SHORT CODE	LONG CODE	FORMULA
1	MTE	MIDTERM EXAM
2	QUZ	QUIZ
3	FIN	FINAL EXAM
4	FCGR	FINAL COURSE GRADE (RESIT)	MTE * 0.30 + ASG * 0.30 + FIN * 0.40
5	RST	RESIT
6	FCGR	FINAL COURSE GRADE (RESIT)	MTE * 0.30 + ASG * 0.30 + RST * 0.40

*** Resit Exam is Not Administered in Institutions Where Resit is not Applicable.

Further Notes About Assessment Methods

Quiz, Homework, Midterm, and Final exam

Assessment Criteria

If your grade letter is AA, BA, BB, CB, CC, DC or DC, you are supposed to pass from this course.

Language of Instruction

English

Course Policies and Rules

70% attendence is compulsory.

Contact Details for the Lecturer(s)

Asst. Dr. Celal Cem Sarıoğlu
E-mail: celalcem.sarioglu@deu.edu.tr
Office : +90 232 3018585

Office Hours

Week days, anytime

Work Placement(s)

None

Workload Calculation

Activities	Number	Time (hours)	Total Work Load (hours)
Lectures	14	4	56
Preparations before/after weekly lectures	13	3	39
Preparation for final exam	1	30	30
Preparation for quiz etc.	2	10	20
Preparation for midterm exam	1	25	25
Final	1	2	2
Midterm	1	2	2
Quiz etc.	2	1	2
TOTAL WORKLOAD (hours)			176

Contribution of Learning Outcomes to Programme Outcomes

PO/LO	PO.1	PO.2	PO.3	PO.4	PO.5	PO.6	PO.7	PO.8	PO.9	PO.10	PO.11	PO.12	PO.13
LO.1	5		4	4	3			3	3		3	4	3
LO.2	5		4	4	3	3		3	3		3
LO.3	5	4	4	3	3	3		3	3	3	3		4
LO.4	5	4	4		3	3	3	3	3		3	3
LO.5	5		4		3	3	3	3	3		3	3

COURSE UNIT TITLE

DEGREE PROGRAMMES

Description of Individual Course Units

Offered By

Level of Course Unit

Course Coordinator

Offered to

Course Objective

Learning Outcomes of the Course Unit

Mode of Delivery

Prerequisites and Co-requisites

Recomended Optional Programme Components

Course Contents

Recomended or Required Reading

Planned Learning Activities and Teaching Methods

Assessment Methods

Further Notes About Assessment Methods

Assessment Criteria

Language of Instruction

Course Policies and Rules

Contact Details for the Lecturer(s)

Office Hours

Work Placement(s)

Workload Calculation

Contribution of Learning Outcomes to Programme Outcomes

CONTACT INFORMATION