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Instructions to follow: * Give original work *Support your work with examples and graphs where required *Follow The references: Kreyszig, Rudin and Robert. G. Bartle. Reference Books: C.D. Aliprantis and O. Burkinshaw, Principles of Real Analysis, 3rd Edition, Harcourt Asia, (2000) J. Bak and D.J. Newman, Complex Analysis, 2nd Edition, Springer Indian Reprint, (2009) Bartle and Sherbert, Introductory Real Analysis, 3rd edition, Wiley International, (2001) E. Kreyssig, Introductory Functional Analysis with Applications, Wiley Singapore Edition, (2001). S. Kumaresan, Topology of Metric Spaces, Narosa, (2005). S. Kumaresan, Real Analysis - An Outline, Unpublished Course Notes (available at http://atts.org.in/downloads) B.V. Limaye, Functional Analysis, 2nd Edition, New Age International Ltd., (1996). W. Rudin, Real and Complex Analysis, TMH Edition, 1973. Throughout these notes, we let KR or KC. We use the symbol, for example, f(x)=r to say that the function f is defined by setting f(x)=r2 for all in the domain. This is same as writing f(x) def. Can you guess what the symbol a² f(x) means? LIIS RIIS means that RIIS is defined by LIIS. I started with the principle that a first course in functional analysis is meant first as a part of the general culture and second as an important tool for any future analyst. Hence the emphasis all through had been to look at concrete spaces of function and linear maps between them. This has two advantages: (1) the students get to see the typical applications of the results of functional analysis to other parts of analysis and (2) while dealing with such The Spectral Theorem for Bounded Self-Adjoint Operators on Hilbert Spaces Formulate the Spectral Theorem for bounded self-adjoint operators on a Hilbert space. Provide a rigorous proof, emphasizing the construction of the projection-valued measure associated with the operator. Discuss the physical interpretation of the theorem in quantum mechanics and how it relates to the concept of observable quantities. Fredholm Operators and Index Theory Let T be a Fredholm operator on a Banach space X. Prove that the index of T', defined by index(T) = dim(ker(T)) - dim(coker(T)), is stable under compact perturbations, i.e., show that if K is compact, then T+K is Fredholm and index(T+K) = index(T). Use this property to discuss applications in spectral theory, particularly in analyzing essential spectra.