Dokuz Eylül University Information Package / Courses Catalog

General Description

History

Department of Mathematics was founded in 1991. The undergraduate program started in 1991, and the Master and PhD programs started in 1993. Our department carries out the Mathematics courses both in the undergraduate and in the graduate programs of the Faculty of Science, Engineering Faculty and the other faculties of our university. As a developing department, our aim is especially to strengthen the department in research and to grow in various sub-branches of mathematics. The language of instruction is English.

Qualification Awarded

Mathematics, Bachelor of Science (B.Sc.)

Level of Qualification

First Cycle (Bachelor's Degree)

Specific Admission Requirements

High school diploma, placement through a nation-wide Student Selection Examination, DEU School of Foreign Languages English Proficiency Test (minimum 70) or TOEFL - IBT (minimum 79) or equivalent.

Specific Arrangements for Recognition of Prior Learning (Formal, Non-Formal and Informal)

Item 12 of Dokuz Eylul University Associate and Bachelors Degree Education and Exam Regulations (dated 12 August 2011 published on the official gazette number 28023) is applied.
(1) The lateral transfers to the university are executed according to the principals that are determined by the Senate according to the Regulations on the Basis of Transfers between Institutions at Upper Secondary Education and Undergraduate level, Double Major, Minor and Transfer of Credits between Institutions published on official gazette dated 24/4/2010 numbered 27561.
(2) On vertical transfers, the regulations on the continuation of the graduates of Vocational School and Open Learning Secondary Education Program Graduates Bachelors Degree Education published on official gazette on 19/2/202 dated 24676 are applied.
(3) On transfers of students that have not or cannot complete their bachelors degree education to the Vocational Schools, the regulations on awarding Upper Secondary Education Degree or adaptation to Vocational Schools for the students who have not completed or cannot complete Bachelors Degree Education published on official gazette dated 18/3/1989 dated 20112 are applied.
See the following link for more information:
http://www.deu.edu.tr/DEUWeb/Icerik/Icerik.php KOD=5683

Qualification Requirements and Regulations

4 years (excluding one year of English Preparatory School), 2 semesters per year, 16 weeks per semester, 240 ECTS in total.

Profile of the Programme

The aim of this program is to provide a solid background both in pure and applied mathematics together with a wide range of elective courses, and to enhance the ability to think analytically and to construct logical solutions.

Key Learning Outcomes

1	To be able to use theoretical and applied knowledge acquired in the fields of mathematics.
2	To be able to transfer the knowledge obtained in the area of mathematics to secondary education
3	To gain ability to solve problems, to reason, to make connections and to generalize.
4	In the areas where mathematics is used, to be able to reach the knowledge, to gain the ability to make necessary references search.
5	To gain the ability to keep oneself up-to-date with the latest developments in Science and Technology
6	To conduct a study in mathematics and in related areas individually or as a group, and to be effective in the deriving conclusion process.
7	To be able to criticize and renew his/her own models.
8	To be able to explain theoretical and technical knowledge of oneself both in a detailed manner to experts and in a clear manner to non-experts
9	To be able to use English actively at the General Level B1 of the European Language Portfolio, to be able to communicate easily with colleagues from our country or abroad, to be able to follow the periodicals
10	To be familiar with the software that is commonly used in the area of mathematics and to use at least one program actively.
11	To be able to act in accordance with the social, scientific and ethic values in every stage of the projects included in
12	To be able to relate abstract concepts in mathematics to concrete situations by scientific methods, to examine and interpret the conclusions
13	To be able to use and apply the knowledge and skills gained in mathematics in various disciplines

Occupational Profiles of Graduates with Examples

Our graduate students can be academicians or teachers, or they can have career in finance or information processing sectors.

Access to Further Studies

May apply to second cycle or third cycle programs.

Course Structure Diagram with Credits

No	Course Unit Code	Course Unit Title	Type of Course	T	P	L	ECTS
Third year students must take and succeed two free elective courses in a year from the common elective courses (English or Turkish) of the faculty or university. Fourth year students must take and succeed two free elective courses in a year from the common elective courses (English or Turkish) of the faculty or university. The language of instruction is English. Head of the department, if necessary, decides to open each course of each semester (Fall-Spring) for 1st, 2nd, 3rd and 4th years. Third year students must take two elective courses in 6th semester.
T: Theoretical P: Practice L: Laboratory B: Spring Semester G: Fall Semester H: Full Year
1. Semester:
1	MAT 1035	ANALYTIC GEOMETRY	COMPULSORY	4	0	0	7
2	MAT 1031	CALCULUS I	COMPULSORY	4	2	0	9
3	MAT 1011	TECHNICAL ENGLISH I	COMPULSORY	3	0	0	5
4	ATA 1001	PRINCIPLES OF ATATURK AND HISTORY OF THE TURKISH REVOLUTION I	COMPULSORY	2	0	0	2
5	MAT 1033	FUNDAMENTALS OF MATHEMATICS I	COMPULSORY	4	0	0	7
TOTAL:							30

2. Semester:
No	Course Unit Code	Course Unit Title	Type of Course	T	P	L	ECTS
1	ATA 1002	PRINCIPLES OF ATATURK AND HISTORY OF THE TURKISH REVOLUTION II	COMPULSORY	2	0	0	2
2	MAT 1032	CALCULUS II	COMPULSORY	4	2	0	9
3	MAT 1034	BASIC ALGEBRAIC STRUCTURES	COMPULSORY	4	0	0	7
4	MAT 1012	TECHNICAL ENGLISH II	COMPULSORY	3	0	0	4
5	MAT 1036	DISCRETE MATHEMATICS	COMPULSORY	4	0	0	6
0	SECGRUP1	ELECTIVE COURSE GROUP 1	ELECTIVE	-	-	-	2
TOTAL:							30

3. Semester:
No	Course Unit Code	Course Unit Title	Type of Course	T	P	L	ECTS
1	CSC 2201	ALGORITHMS AND PROGRAMMING	COMPULSORY	2	2	0	5
2	MAT 2043	ANALYSIS I	COMPULSORY	4	2	0	9
3	TDL 1001	TURKISH LANGUAGE I	COMPULSORY	2	0	0	2
4	MAT 2037	LINEAR ALGEBRA I	COMPULSORY	4	0	0	7
5	MAT 2039	DIFERENTIAL EQUATIONS I	COMPULSORY	4	0	0	7
TOTAL:							30

4. Semester:
No	Course Unit Code	Course Unit Title	Type of Course	T	P	L	ECTS
1	MAT 2038	LINEAR ALGEBRA II	COMPULSORY	4	0	0	7
2	MAT 2042	COMPUTER ALGEBRA SYSTEMS	COMPULSORY	2	2	0	5
3	TDL 1002	TURKISH LANGUAGE II	COMPULSORY	2	0	0	2
4	MAT 2040	DIFERENTIAL EQUATIONS II	COMPULSORY	4	0	0	7
5	MAT 2044	ANALYSIS II	COMPULSORY	4	2	0	9
TOTAL:							30

5. Semester:
No	Course Unit Code	Course Unit Title	Type of Course	T	P	L	ECTS
1	MAT 3055	ALGEBRA I	COMPULSORY	4	0	0	7
2	MAT 3051	DIFERENTIAL GEOMETRY	COMPULSORY	4	0	0	7
3	MAT 3049	INTRODUCTION TO TOPOLOGY	COMPULSORY	4	0	0	7
4	MAT 3059	NUMERICAL ANALYSIS I	COMPULSORY	4	0	0	7
0	SECGRUP2	ELECTIVE COURSE GROUP 2	ELECTIVE	-	-	-	2
TOTAL:							30

6. Semester:
No	Course Unit Code	Course Unit Title	Type of Course	T	P	L	ECTS
1	MAT 3052	PARTIAL DIFERENTIAL EQUATIONS	COMPULSORY	4	0	0	7
2	MAT 3050	COMPLEX CALCULUS	COMPULSORY	4	0	0	7
0	SECGRUP3	ELECTIVE COURSE GROUP 3	ELECTIVE	-	-	-	16
TOTAL:							30

7. Semester:
No	Course Unit Code	Course Unit Title	Type of Course	T	P	L	ECTS
0	SECGRUP4	ELECTIVE COURSE GROUP 4	ELECTIVE	-	-	-	30
TOTAL:							30

8. Semester:
No	Course Unit Code	Course Unit Title	Type of Course	T	P	L	ECTS
0	SECGRUP5	ELECTIVE COURSE GROUP 5	ELECTIVE	-	-	-	30
TOTAL:							30

ELECTIVE COURSE GROUP 1:
No	Course Unit Code	Course Unit Title	Type of Course	T	P	L	ECTS
0	HERDONEM	EXTRA CHOSE FLEXIBLE ELECTIVE COURSE ACCORDING TO ECTS	ELECTIVE	-	-	-	-
1	GSR 1003	PAINTING	ELECTIVE	2	0	0	2
2	GSH 1003	FOLK DANCING	ELECTIVE	2	0	0	2
3	GSM 1003	MUSIC	ELECTIVE	2	0	0	2
4	BDE 1003	PHYSICAL EDUCATION	ELECTIVE	2	0	0	2

ELECTIVE COURSE GROUP 2:
No	Course Unit Code	Course Unit Title	Type of Course	T	P	L	ECTS
0	HERDONEM	EXTRA CHOSE FLEXIBLE ELECTIVE COURSE ACCORDING TO ECTS	ELECTIVE	-	-	-	-

ELECTIVE COURSE GROUP 3:
No	Course Unit Code	Course Unit Title	Type of Course	T	P	L	ECTS
0	HERDONEM	EXTRA CHOSE FLEXIBLE ELECTIVE COURSE ACCORDING TO ECTS	ELECTIVE	-	-	-	-
1	MAT 3053	REAL ANALYSIS I	ELECTIVE	4	0	0	7
2	MAT 3046	ALGEBRA II	ELECTIVE	4	0	0	7
3	MAT 3008	NUMERICAL ANALYSIS II	ELECTIVE	4	0	0	7
4	MAT 3058	PROBABILITY	ELECTIVE	4	0	0	7
5	CSC 3202	OBJECT ORIENTED PROGRAMMING	ELECTIVE	4	0	0	7
6	MAT 3042	ADVANCED DIFERENTIAL GEOMETRY	ELECTIVE	4	0	0	7
7	MAT 3026	SPECIAL FUNCTIONS AND DIFERENTIAL EQNS.	ELECTIVE	4	0	0	7

ELECTIVE COURSE GROUP 4:
No	Course Unit Code	Course Unit Title	Type of Course	T	P	L	ECTS
0	HERDONEM	EXTRA CHOSE FLEXIBLE ELECTIVE COURSE ACCORDING TO ECTS	ELECTIVE	-	-	-	-
1	PHY 4166	INTRODUCTION TO QUANTUM MECHANICS	ELECTIVE	4	0	0	7
2	MAT 4013	APPLIED MATHEMATICS I	ELECTIVE	4	0	0	7
3	MAT 4045	GALOIS THEORY	ELECTIVE	4	0	0	7
4	MAT 4065	COMPUTATIONAL COMMUTATIVE ALGEBRA I	ELECTIVE	4	0	0	7
5	MAT 4057	LIFE INSURANCE MATHEMATICS	ELECTIVE	4	0	0	7
6	MAT 4033	NONLINEAR DIFERENTIAL EQUATIONS AND DYNMC. SYST.	ELECTIVE	4	0	0	7
7	MAT 4051	GRAPH THEORY	ELECTIVE	4	0	0	7
8	MAT 4067	COMMUTATIVE RING THEORY	ELECTIVE	4	0	0	7
9	MAT 4035	MATH. METHODS IN COMP. AIDED GEOM. DESIGN	ELECTIVE	4	0	0	7
10	MAT 4019	ASYMPTOTIC ANALYSIS	ELECTIVE	4	0	0	7
11	MAT 4031	GENERAL TOPOLOGY	ELECTIVE	4	0	0	7
12	MAT 4053	ALGEBRAIC NUMBER THEORY	ELECTIVE	4	0	0	7
13	MAT 4059	INTRODUCTION TO FUNCTIONAL ANALYSIS	ELECTIVE	4	0	0	7
14	MAT 4043	ELEMENTARY ALGEBRAIC GEOMETRY	ELECTIVE	4	0	0	7
15	CSC 4201	VISUAL PROGRAMMING TECHNIQUES	ELECTIVE	4	0	0	7
16	MAT 4011	NUMERICAL SOLU.OF ORDINA.DIFE.EQU.	ELECTIVE	4	0	0	7
17	MAT 4047	APPLIED OPTIMIZATION	ELECTIVE	4	0	0	7
18	PHY 4165	INTERMADIATE CLASSICAL MECHANICS	ELECTIVE	4	0	0	7
19	MAT 4029	THEORY OF MANIFOLDS	ELECTIVE	4	0	0	7
20	MAT 4049	ELEMENTARY ALGEBRAIC TOPOLOGY	ELECTIVE	4	0	0	7
21	STA 4201	STATISTICAL METHODS	ELECTIVE	4	0	0	7

ELECTIVE COURSE GROUP 5:
No	Course Unit Code	Course Unit Title	Type of Course	T	P	L	ECTS
0	HERDONEM	EXTRA CHOSE FLEXIBLE ELECTIVE COURSE ACCORDING TO ECTS	ELECTIVE	-	-	-	-
1	CSC 4202	COMPUTER PROGRAMMING FOR DATA MANAGEMENT	ELECTIVE	4	0	0	7
2	MAT 4066	COMPUTATIONAL COMMUTATIVE ALGEBRA II	ELECTIVE	4	0	0	7
3	MAT 4068	GEOMETRY	ELECTIVE	4	0	0	7
4	MAT 4008	PERTURBATION TECHNIQUES	ELECTIVE	4	0	0	7
5	MAT 4010	MODULES AND RINGS	ELECTIVE	4	0	0	7
6	MAT 4024	NUMERICAL SOLUTION OF PARTIAL DIFEREN.EQUATIONS	ELECTIVE	4	0	0	7
7	MAT 4034	NONLINEAR PARTIAL DIFERANTIAL EQUATIONS	ELECTIVE	4	0	0	7
8	MAT 4038	PRINCIPLES OF ECONOMICS	ELECTIVE	4	0	0	7
9	MAT 4030	DIFERENCE EQUATIONS	ELECTIVE	4	0	0	7
10	MAT 4054	FINANCIAL MATHEMATICS	ELECTIVE	4	0	0	7
11	MAT 4070	PROJECT	ELECTIVE	2	4	0	7
12	MAT 4044	MATH. MODELING AND ITS PHILOSOPHY	ELECTIVE	4	0	0	7
13	MAT 4014	APPLIED MATHEMATICS II	ELECTIVE	4	0	0	7
14	MAT 4016	RIEMANNIAN GEOMETRY	ELECTIVE	4	0	0	7
15	MAT 4012	ELEMENTARY TOPOLOGY AND GEOMETRY	ELECTIVE	4	0	0	7
16	MAT 4060	INTRODUCTION TO MATHEMATICAL BIOLOGY	ELECTIVE	4	0	0	7
17	MAT 4058	TOPOLOGICAL VECTOR SPACES	ELECTIVE	4	0	0	7
18	MAT 4062	INRODUCTION TO REPRESENTATION THEORY	ELECTIVE	4	0	0	7
19	MAT 4064	NUMBER THEORY	ELECTIVE	4	0	0	7
20	MAT 4046	MEASURE THEORY AND LEBESQUE INTEGRAL	ELECTIVE	4	0	0	7



FLEXIBLE ELECTIVE COURSE ACCORDING TO ECTS
No	Course Unit Code	Course Unit Title	Type of Course	T	P	L	ECTS
1	FSH 0006	HISTORY OF SCIENCE	ELECTIVE	2	0	0	2
2	FSH 0038	FOREIGN LANGUAGE RUSSIAN II	ELECTIVE	2	0	0	2
3	FSH 0017	CULTURAL HISTORY OF THE AEGEAN	ELECTIVE	2	0	0	2
4	FSH 0020	MANAGEMENT	ELECTIVE	2	0	0	2
5	FSH 0024	BASIC LAW	ELECTIVE	2	0	0	2
6	FSH 0033	SEMANTICS	ELECTIVE	2	0	0	2
7	FSH 0001	COMMUNICATION SKILLS	ELECTIVE	2	0	0	2
8	FSH 0003	PHILOSOPHY (HISTORY OF IDEAS)	ELECTIVE	2	0	0	2
9	FSH 0015	GLOBALIZATION AND THE NEW WORLD ORDER	ELECTIVE	2	0	0	2
10	FSH 0021	ECONOMICS	ELECTIVE	2	0	0	2
11	FSH 0022	ACCOUNTING	ELECTIVE	2	0	0	2
12	FSH 0036	ECONOMIC GLOBALIZATION	ELECTIVE	2	0	0	2
13	FSH 0030	TECHNICAL ENGLISH	ELECTIVE	2	0	0	2
14	FSH 0029	BASIC BANKING AND INFORMATION TECHNOLOGIES	ELECTIVE	2	0	0	2
15	FSH 0016	ANATOLIAN CIVILIZATIONS	ELECTIVE	2	0	0	2
16	FSH 0023	MARKETING	ELECTIVE	2	0	0	2
17	FSH 0035	FINANCIAL ECONOMICS	ELECTIVE	2	0	0	2
18	FSH 0009	MULTISIDED THINKING	ELECTIVE	2	0	0	2
19	FSH 0008	SCIENCE IN DAILY LIFE	ELECTIVE	2	0	0	2
20	FSH 0040	CHEMISTRY AND ART	ELECTIVE	2	0	0	2
21	FSH 0027	HISTORY OF TURKISH EDUCATION	ELECTIVE	2	0	0	2
22	FSH 0002	PROFESSIONAL VALUES AND ETHICS	ELECTIVE	2	0	0	2
23	FSH 0010	INTERDISCIPLINARITY: SCIENCE, ART, GAME	ELECTIVE	2	0	0	2
24	FSH 0012	FUTURE PLANNING AND STRATEGY	ELECTIVE	2	0	0	2
25	FSH 0013	YOUTH ENTREPRENEURSHIP	ELECTIVE	2	0	0	2
26	FSH 0018	MUSEUM AND ART	ELECTIVE	2	0	0	2
27	FSH 0004	PHILOSOPHY OF SCIENCE	ELECTIVE	2	0	0	2
28	FSH 0026	TOTAL QUALITY AND ACCREDITATION	ELECTIVE	2	0	0	2
29	FSH 0014	GEOPOLITICS OF TURKEY	ELECTIVE	2	0	0	2
30	FSH 0019	DISCOURSE ANALYSIS	ELECTIVE	2	0	0	2
31	FSH 0007	SOLUTION OF INTERPERSONAL CONFLICTS	ELECTIVE	2	0	0	2
32	FSH 0011	CREATIVITY, RD, İNNOVATION	ELECTIVE	2	0	0	2
33	FSH 0031	TRANSLATION	ELECTIVE	2	0	0	2
34	FSH 0037	FOREIGN LANGUAGE RUSSIAN I	ELECTIVE	2	0	0	2
35	FSH 0025	MONEY AND BANKING	ELECTIVE	2	0	0	2
36	FSH 0032	TEXT ANALYSIS	ELECTIVE	2	0	0	2
37	FSH 0034	TERMINOLOGY AND TERMINOGRAPHY	ELECTIVE	2	0	0	2
38	FSH 0005	INTRODUCTION TO PSYCHOLOGY	ELECTIVE	2	0	0	2
39	FSH 0028	FLOWERING PLANTS, NATURE'S HEALING HANDS	ELECTIVE	2	0	0	2

Examination Regulations, Assessment and Grading

For each course, examination regulations, assessment criteria and grading system are specified in the Course Description Forms.

Graduation Requirements

The degree is awarded to students who have successfully completed all the courses in the curriculum and have a minimum Cumulative Grade Point Average (CGPA) of 2.00 / 4.00 and 240 ECTS.

Mode of Study (Full-Time, Part-Time, E-Learning )

Full-time

Programme Director or Equivalent

Prof. Dr. Halil Oruç
Phone: (232) 301 85 08
E-mail: halil.oruc@deu.edu.tr

DEGREE PROGRAMMES