Advanced Real Analysis-I
This course will enable the students to –
- Explore their knowledge in the area of real analysis.
- Get sufficient knowledge of the subject which can be used by students for further applications in their respective domains of interest.
- Understand the Introduction of Ordinal number, perfect sets, Borel measureable functions.
- Get ideas about approximate continuous function, Henstock integration.
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Course |
Learning outcomes (at course level) |
Learning and teaching strategies |
Assessment Strategies |
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Course Code |
Course Title |
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24MAT 324(C) |
Advanced Real Analysis-I (Theory)
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CO113: Outline the concept of ordinal numbers. CO114: Determine properties of perfect set and prove related theorems. CO115: Explore properties of Borel measurable functions and Darbous function of Baire class one. CO116: Analyze characteristics of approximate continuous function. CO117: Explain the concept of Henstock integration on the real line. CO118: Contribute effectively in course-specific interaction.
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Approach in teaching: Interactive Lectures, Discussion, Informative videos
Learning activities for the students: Self learning assignments, Effective questions, Topic presentation, Assigned tasks |
Quiz, Class Test, Individual projects, Open Book Test, Continuous Assessment, Semester End Examination
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Order types, Well-ordered sets, Transfinite induction, Ordinal numbers, Comparability of ordinal numbers, Arithmetic of ordinal numbers, First uncountable ordinal Ω.
Perfect sets, Decomposition of a closed set in terms of perfect sets of first category, 2nd category and residual sets, Characterization of a residual set in a complete metric space, Borel sets of class α, ordinal α < Ω, Density point of a set in R, Lebesgue density theorem.
Borel measurable functions of class α (α < Ω) and its basic properties, Comparison of Baire and Borel functions, Darboux functions of Baire class one.
Nature of the sets of points of discontinuity of Baire one functions, approximate continuity and its fundamental properties, Characterization of approximate continuous functions.
Concepts of δ-fine partition of the closed interval [a,b] where δ is a positive function on [a,b], Cousin’s lemma, definition of Henstock integral of a functions over the interval [a,b] and its basic properties, Saks-Henstock lemmas and its applications, Continuity of the indefinite integral, Fundamental theorem, Convergence theorems, Absolute Henstock integrability, Characterization of Lebesgue integral by absolute Henstock integral.
- A.M. Bruckner, J.B. Bruckner and B.S. Thomson, Real Analysis, Prentice-Hall, New York 1997.
- H.S. Gaskill and P.P. Narayanswami, Elements of Real Analysis, PHI, 1988.
- W.P. Parzynski and P.W. Zipse, Introduction to Mathematical Analysis, MC Graw-Hill Company, 1982.
- I.P. Natanson, Theory of Functions and Real Variable, Vol. I& II, Frederic Ungar Publishing, 1955.
- C. Goffman, Real Functions, Rinehart Company, N.Y. 1953.
SUGGESTED READING
- P.Y. Lee, Lanzhou Lectures on Henstock Integration, World Scintific Press, 1990.
- J.F. Randolph, Basic Real and Abstract Analysis, Academic Press, N.Y. 2014.
- S.M. Srivastava, A Course on Borel Sets, Springer, N.Y. 1998.
- R.G. Rartle, Introduction to Real Analysis, John Willey and Sons, 2000.
- A.J. Kosmala, Introductory Mathematical Analysis, WCB Company, 1995.
e- RESOURCES
- http://www.math.nagoya-u.ac.jp/~richard/teaching/f2017/Folland_A_Guide.pdf
- https://www.math.purdue.edu/~torresm/pubs/Modern-real-analysis.pdf
- https://nptel.ac.in/courses/111106142
JOURNALS
