MAT4051 Advanced Complex AnalysisBahçeşehir UniversityDegree Programs TEXTILE AND FASHION DESIGNGeneral Information For StudentsDiploma SupplementErasmus Policy StatementBologna CommissionNational Qualifications
TEXTILE AND FASHION DESIGN
Bachelor TR-NQF-HE: Level 6 QF-EHEA: First Cycle EQF-LLL: Level 6

Course Introduction and Application Information

Course Code Course Name Semester Theoretical Practical Credit ECTS
MAT4051 Advanced Complex Analysis Spring 3 0 3 6
This catalog is for information purposes. Course status is determined by the relevant department at the beginning of semester.

Basic information

Language of instruction: English
Type of course: Non-Departmental Elective
Course Level: Bachelor’s Degree (First Cycle)
Mode of Delivery: Face to face
Course Coordinator :
Recommended Optional Program Components: There is none.
Course Objectives: To study advanced studies and applications in the theory of functions of a complex variable.

Learning Outcomes

The students who have succeeded in this course;
Grap residue theorem and its applications in evaluation of reel integrals

Explain general principles of theory of conformal mappings.

Grab Laplace and Fourier Transforms.

Course Content

Concept of Residue, Residue Theorem.
Applications of Residue Theorem to Real Integrals.
Argument Principle, Rouche and Hurwitz Theorems.
Infınıte Products, Weierstrass Formula.
Representation Entire and Meromorphic Functions as an Infınıte Product, Mittag-Leffler Formula.
Concept of Analytic Continuity, Analytic Continuity of an Analytic Function.
Weierstrass Method of Analytic Continuity.
General Principle of Conformal Mappings.
Riemann Mapping Theorem.
Riemann-Schwarz Symmetry Principle, Christoffel-Schwarz Formula.
Functions Denoted by Cauchy Kernel.
Regularity of an Integral Depending on a Parameter.
Laplace Transform.
Fourier Transform.

Weekly Detailed Course Contents

Week Subject Related Preparation
1) Concept of Residue, Residue Theorem.
2) Applications of Residue Theorem to Real Integrals.
3) Argument Principle, Rouche and Hurwitz Theorems.
4) Infınıte Products, Weierstrass Formula.
5) Representation Entire and Meromorphic Functions as an Infınıte Product, Mittag-Leffler Formula.
6) Concept of Analytic Continuity, Analytic Continuity of an Analytic Function.
7) Weierstrass Method of Analytic Continuity.
8) General Principle of Conformal Mappings.
9) Riemann Mapping Theorem.
10) Riemann-Schwarz Symmetry Principle, Christoffel-Schwarz Formula.
11) Functions Denoted by Cauchy Kernel.
12) Regularity of an Integral Depending on a Parameter.
13) Laplace Transform.
14) Fourier Transform.

Sources

Course Notes / Textbooks: A.I. Markushevich “Theory of Functions of a Complex Variable”
Ruel V. Churchill, James Ward Brown, “Complex variables and applications”
References: .

Evaluation System

Semester Requirements Number of Activities Level of Contribution
Attendance 16 % 0
Homework Assignments 7 % 10
Midterms 2 % 50
Final 1 % 40
Total % 100
PERCENTAGE OF SEMESTER WORK % 60
PERCENTAGE OF FINAL WORK % 40
Total % 100

ECTS / Workload Table

Activities Number of Activities Duration (Hours) Workload
Course Hours 14 3 42
Study Hours Out of Class 14 2 28
Homework Assignments 7 2 14
Midterms 2 10 20
Final 1 21 21
Total Workload 125

Contribution of Learning Outcomes to Programme Outcomes

No Effect 1 Lowest 2 Low 3 Average 4 High 5 Highest
           
Program Outcomes Level of Contribution
1) Understands the principles of artistic creation and basic design and applies the art and design objects he creates within this framework.
2) Conducts the multifaceted research required for textile and fashion design processes and analyzes and interprets the results.
3) Creates original and applicable fabric, clothing and pattern designs by using elements from different historical periods and cultures in accordance with his purpose.
4) Recognizes textile raw materials and equipments.
5) Uses computer programs effectively in the garment and fabric surface design process.
6) Has professional technical knowledge regarding the implementation of clothing designs and production; In this context, recognizes and uses technological tools and equipment.
7) Understands the importance of interdisciplinary interaction and communication in textile and clothing design-production-presentation processes and reflects this on the processes.
8) Works in a programmed and disciplined manner in professional practices.
9) Realizes the necessity of lifelong learning to maintain his productivity, creativity and professional competence.
10) Understands, adopts and applies ethical responsibilities in professional practices; Has knowledge of relevant legal regulations.
11) Establishes effective visual, written and verbal communication in the field of textile and fashion design.
12) Reflects his knowledge on current and contemporary issues from all fields to his professional theoretical and practical studies on textile and clothing design; Understands the social and universal effects of these issues.
13) Has sufficient awareness about social justice, environmental awareness, quality culture and protection of cultural values.