Normed linear spaces, Quotient space of normed linear spaces and its completeness, Banach spaces and examples, Bounded linear transformations.
Normed linear space of bounded linear transformations, Equivalent norms, Basic properties of finite dimensional normed linear spaces and compactness, Riesz lemma.
Open mapping theorem, Closed graph theorem, Uniform boundness theorem, Continuous linear functional, Hahn-Banach theorem and its consequences.
Hilbert space and its properties, Orthogonality and functionals in Hilbert spaces, Phythagorean theorem, Projection theorem, Orthonormal sets.
Bessel’s inequality, Complete orthonormal sets, Parseval’s identity, Structure of a Hilbert space, Riesz representation theorem.
1. G.F. Simmons, Topology and Modern Analysis, Mc-Graw Hill, 1963.
2. G. Bachman, Lawrence Narici, Functional Analysis, Academic Press, 1966.
3. Dileep S. Chauhan, Functional Analysis and calculus in Banach space, Jaipur Publishing House, 2013.