Lesson plan / INTEGRAL EQUATIONS

Lesson Information

Course Credit 3.0
Course ECTS Credit 5.0
Teaching Language of Instruction Türkçe
Level of Course Bachelor's Degree, TYYÇ: Level 6, EQF-LLL: Level 6, QF-EHEA: First Cycle
Type of Course Programme Elective
Mode of Delivery Face-to-face
Does the course require compulsory or optional work experience? S
Course Coordinator
Instructor (s)
Course Assistant Prof. Dr. İSMAİL TOK

Purpose and Content

The aim of the course This course aims to give the defnitions history of the integral equations,basic properties, evoluation, Abel integral equations , linear homogeneous integral equations and solutions of the Fredholm integral equations ,relation between differential and integral equations .
Course Content This course covers defnitions history of the integral equations,basic properties,evoluation, kernel function , Abel integral equations and its solutions , linear homogeneous integral equations ,linear non-homogeneous integral equations and its solutions , linear homogeneous singular integral equations ,linear non-homogeneous singular integral equations , linear homogeneous integro differential equations,Linear non-homogeneous integro differential equations , relation between differential and integral equations , transformation of a differential equation to the integral equation , transformation of a integral equation to the differential equation, obtaining the iteration kernels , Volterra Integral Equations and its solutions,Fredholm Integral Equations and its solutions.

Weekly Course Subjects

1History of the integral equations,basic properties,evoluation, kernel function.
2Abel integral equations and its solutions.
3Linear homogeneous integral equations.
4Linear non-homogeneous integral equations and its solutions. ,
5Linear homogeneous singular integral equations.
6Linear non-homogeneous singular integral equations.
7Linear homogeneous integro differential equations.
8Linear non-homogeneous integro differential equations.
9Relation between differential and integral equations .Midterm Exam.
10Transformation of a differential equation to the integral equation.
11Ttransformation of a integral equation to the differential equation.
12Iteration kernels.
13Volterra Integral Equations and its solutions.
14Fredholm Integral Equations and its solutions.

Resources

1- Tricomi, F. G., Integral equations.

2 - Bitsadze, A. V.,Integral equations of fırst kind.

3- Abdul J. Jerri, Introduction to integralequations with applications.

4-Y. Aksoy, İntegral Denklemler, İstanbul, 1983.

5- Baker, C. T. H. The Numerical Treatment of Integral Equations.

6- James Alan Cochran, Analysis of Linear Integral Equations, McGraw-Hill, 1972.

7- David Porter and David S.G. Stirling, Integral Equations, Cambridge Texts in Applied Mathematics, 1990.
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