TY - BOOK AU - Limaye, Balmohan V. TI - Linear functional analysis for scientists and engineers SN - 9789819706044 U1 - 517.98 PY - 2016/// CY - Singapore PB - Springer Science+Business Media KW - Balmohan V. Limaye KW - Functional analysis KW - Functions of real variables KW - Real Functions KW - Banach Space KW - Bounded Inverse Theorem KW - Bounded Linear Map KW - Closed Graph Theorem KW - Hilbert Space KW - Normal Operator KW - Eigenspectrum KW - Hahn-Banach Theorems KW - Spectral Theory KW - Open Mapping Theorem KW - Zabreiko Theorem KW - Uniform Boundedness Principle N1 - Prerequisites Basic Framework Bounded Linear Maps Dual Spaces, Transposes and Adjoints Spectral Theory Correction to: Linear Functional Analysis for Scientists and Engineers; Provides a concise introduction to linear functional analysis Presents results in the basic framework of a normed space and of an inner product space Includes a result by Zabreiko, which is used to deduce several major theorems in functional analysis Contains 160 exercises of various difficulty levels, and their solutions provided at the end of the book Will benefit senior undergraduate students in mathematics and graduate students in the natural sciences and engineering N2 - This book provides a concise and meticulous introduction to functional analysis. Since the topic draws heavily on the interplay between the algebraic structure of a linear space and the distance structure of a metric space, functional analysis is increasingly gaining the attention of not only mathematicians but also scientists and engineers. The purpose of the text is to present the basic aspects of functional analysis to this varied audience, keeping in mind the considerations of applicability. A novelty of this book is the inclusion of a result by Zabreiko, which states that every countably subadditive seminorm on a Banach space is continuous. Several major theorems in functional analysis are easy consequences of this result. The entire book can be used as a textbook for an introductory course in functional analysis without having to make any specific selection from the topics presented here. Basic notions in the setting of a metric space are defined in terms of sequences. These include total boundedness, compactness, continuity and uniform continuity. Offering concise and to-the-point treatment of each topic in the framework of a normed space and of an inner product space, the book represents a valuable resource for advanced undergraduate students in mathematics, and will also appeal to graduate students and faculty in the natural sciences and engineering. The book is accessible to anyone who is familiar with linear algebra and real analysis UR - https://link.springer.com/book/10.1007/978-981-10-0972-3 ER -