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20402085 AM310 - ELEMENTS OF ADVANCED ANALYSIS in Mathematics L-35 N0 ESPOSITO PIERPAOLO, BATTAGLIA LUCA
(syllabus)
1. Abstract integration theory Riemann integration theory. The concept of measurability. Step functions. Elementary properties of measures. Arithmetic in [0,∞]. Integration of positive functions. Integration of complex functions. Importance of sets with null measure. 2. Positive Borel measures Vector spaces. Topological preliminaries. Riesz representation theorem. Regularity properties of Borel measures. Lebesgue measure. Continuity properties of measurable functions. 3. L^p spaces Inequalities and convex functions. L^p spaces. Approximation through continuous functions. 4. Basic theory of Hilbert spaces Inner products and linear functionals. Dual space of L^2 4. Integration on product spaces Measurability on cartesian products. Product measure. Fubini theorem. 4. Complex measures Total variation. Absolute continuity. Radon-Nykodym theorem. Bounded linear functionals on L^p. The Riesz representation theorem.
(reference books)
"Analisi reale e complessa”, W. Rudin. Bollati Boringhieri.
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