Fourier Analysis

Course Information
TitleΑΝΑΛΥΣΗ FOURIER / Fourier Analysis
Code0234
FacultySciences
SchoolMathematics
Cycle / Level1st / Undergraduate
Teaching PeriodSpring
CoordinatorPetros Galanopoulos
CommonYes
StatusActive
Course ID40000500

Programme of Study: UPS of School of Mathematics (2014-today)

Registered students: 36
OrientationAttendance TypeSemesterYearECTS
CoreElective Courses belonging to the selected specializationSpring-5.5

Class Information
Academic Year2017 – 2018
Class PeriodSpring
Faculty Instructors
Weekly Hours3
Class ID
600099227
Mode of Delivery
  • Face to face
Digital Course Content
Course Content (Syllabus)
Trigonometric series - Fourier coefficients - Fourier series - Convergence of Fourier series - Theorems of Dini and Dirichlet - Summability of Fourier Series - The space of square integrable functions and Fourier series- Parseval identity - Applications. Trigonometric series - Fourier coefficients - Fourier series - Convergence of Fourier series - Theorems of Dini and Dirichlet - Summability of Fourier Series - The space of square integrable functions and Fourier series- Parseval identity - Applications.
Last Update
21-09-2013