Topics in Functions of One Variable (MAE515): Διαφορά μεταξύ των αναθεωρήσεων
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=== General === | === General === | ||
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! Course Code | ! Course Code | ||
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ΜΑΕ515 | |||
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! Semester | ! Semester | ||
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5 | |||
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! Course Title | ! Course Title | ||
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Topics | Topics in Functions of One Variable | ||
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! Independent Teaching Activities | ! Independent Teaching Activities | ||
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The objective of the course is the undergraduate student's ability achievement in analysis and synthesis of the basic background in the theory of real functions. | The objective of the course is the undergraduate student's ability achievement in analysis and synthesis of the basic background in the theory of real functions. | ||
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=== Syllabus === | === Syllabus === | ||
Monotone functions-continuity, functions of bounded variation | |||
Monotone functions - points of continuity, functions of bounded variation, sets of measure zero, Lebesgue's theorem (every monotone function is differentiable almost everywhere), Darboux continuous functions-definitions, properties, equivalent characterizations, convex functions, semicontinuous functions, continuity points of Riemann integrable functions, Baire classes, Borel measurable functions, analytic sets-characterizations, connections with Borel sets-related theory, Lebesgue integral, Stieltjes integral. | |||
=== Teaching and Learning Methods - Evaluation === | === Teaching and Learning Methods - Evaluation === | ||
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Τελευταία αναθεώρηση της 18:21, 17 Αυγούστου 2024
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General
School |
School of Science |
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Academic Unit |
Department of Mathematics |
Level of Studies |
Undergraduate |
Course Code |
ΜΑΕ515 |
Semester |
5 |
Course Title |
Topics in Functions of One Variable |
Independent Teaching Activities |
Lectures (Weekly Teaching Hours: 3, Credits: 6) |
Course Type |
Special Background |
Prerequisite Courses | - |
Language of Instruction and Examinations |
Greek |
Is the Course Offered to Erasmus Students |
Yes |
Course Website (URL) | See eCourse, the Learning Management System maintained by the University of Ioannina. |
Learning Outcomes
Learning outcomes |
The plan of the course is the achievement by the undergraduate student of special theoretical background in the theory of real functions. |
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General Competences |
The objective of the course is the undergraduate student's ability achievement in analysis and synthesis of the basic background in the theory of real functions. |
Syllabus
Monotone functions - points of continuity, functions of bounded variation, sets of measure zero, Lebesgue's theorem (every monotone function is differentiable almost everywhere), Darboux continuous functions-definitions, properties, equivalent characterizations, convex functions, semicontinuous functions, continuity points of Riemann integrable functions, Baire classes, Borel measurable functions, analytic sets-characterizations, connections with Borel sets-related theory, Lebesgue integral, Stieltjes integral.
Teaching and Learning Methods - Evaluation
Delivery |
Face-to-face | ||||||||||
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Use of Information and Communications Technology | - | ||||||||||
Teaching Methods |
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Student Performance Evaluation |
Written examination at the end of the semester. |
Attached Bibliography
See the official Eudoxus site or the local repository of Eudoxus lists per academic year, which is maintained by the Department of Mathematics. Books and other resources, not provided by Eudoxus:
- A.C.M. Van Rooij, W.H. Schikhof, Α second course on real functions, Cambridge University Press.