MEASURE THEORY
- Gain understanding of the abstract measure theory and definition and main properties of the integral.
- To construct Lebesgue's measure on the real line and in n-dimensional Euclidean space.
- To explain the basic advanced directions of the theory.
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Learning Outcomes |
Learning and teaching strategies |
Assessment |
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After the completion of the course the students will be able to: CLO6- students get ideas about the theory of measure. CLO7- Student know how to develop the ideas of Lebesgue integration and its properties CLO8- students know how to show that certain functions are measurable:
CLO9- Students know about Lebesgue theorem on the passage to the limit under the integral sign for bounded measurable functions, Summable functions: Space of square summable functions. Fourier series and coefficients, Parseval's identity, Riesz-Fisher Theorem. CLO10- Students know about Lp-spaces, Holder - Minkowski inequalities, Completeness of L p -spaces. |
Approach in teaching: Interactive Lectures, Discussion, Tutorials, Reading assignments, Demonstration, Team teaching Learning activities for the students: Self learning assignments, Effective questions, Simulation, Seminar presentation, Giving tasks, Field practical
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Presentations by Individual Students. Class Tests at Periodic Intervals. Written assignment(s) Semester End Examination
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Algebra and algebras of sets, Algebras generated by a class of subsets, Borel sets, Lebesgue measure of sets of real numbers, Measurability and measure of a set, Existence of non-measurable sets.
Measurable functions:Realization of non-negative measurable function as limit of an increasing sequence of simple functions, Structure of measurable functions, Convergence in measure, Egoroff's theorem.
Lebesgue integral of bounded measurable functions, Lebesgue theorem on the passage to the limit under the integral sign for bounded measurable functions.
Summable functions: Space of square summable functions. Fourier series and coefficients, Parseval's identity, Riesz-Fisher Theorem.
Lp-spaces, Holder-Minkowski inequalities, Completeness of Lp-spaces.
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- T.M.Apostol, Mathematical Analysis, Narosa Publishing House, New Delhi, 1996.
- Walter Rudin, Real and ComplexAnalysis, McGraw-Hill Education, 1986.
- P.K.Jain and S.K.Kaushik, An Introduction to Real Analysis, S.Chand & Co, New Delhi,2000.
- R.R.Goldberg, Real Analysis,Oxford and IBH publishing Company, New Delhi, 1970.
- Halsey Royden, Patrick Fitzpatrick, Real Analysis, Pearson’s United States Edition, 2010.
- G.F.Simmons, Introduction to Topology and Modern Analysis, McGraw-Hill Book, NewDelhi, 1963.
- G.De.Barra, Measure Theory and Integration, Wiley Eastern, 1981.
- S.K.Berberian, Measure and Integration, McMillan, NewYork,1965.
- I.K.Rana,An Introduction to Measure and Integration, Narosa Publishing House New Delhi,1997.
