# Mathematical introduction to compressive sensing

##### By: Foucart, Simon.

##### Contributor(s): Rauhut, Holger.

Material type: BookPublisher: New York : Springer, ©2013Description: xviii, 625 p. : ill. ; 25 cm.ISBN: 9780817649470.Subject(s): Mathematics | Computer science | Functional analysis | Telecommunication | Mathematics | Computational Science and Engineering | Signal, Image and Speech Processing | Math Applications in Computer Science | Communications Engineering, Networks | Functional AnalysisOnline resources: Full text available from SpringerLink ebooks - Mathematics and Statistics (2013)Item type | Current location | Collection | Call number | Status | Date due | Barcode | Item holds |
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Books | IIITD Book Cart | Computer Science and Engineering | REF 004.23 FOU-A (Browse shelf) | Not For Loan | 005212 |

##### Browsing IIITD Shelves , Shelving location: Book Cart , Collection code: Computer Science and Engineering Close shelf browser

511.35 GHO-I Introduction theory of automata, formal languages, and computation | 519.4 RAO-N Numerical methods for scientists and engineers | 519.5 MIS-C Computer oriented numerical and statistical methods | REF 004.23 FOU-A Mathematical introduction to compressive sensing |

Includes bibliographical references and index.

1 An Invitation to Compressive Sensing -- 2 Sparse Solutions of Underdetermined Systems -- 3 Basic Algorithms -- 4 Basis Pursuit -- 5 Coherence -- 6 Restricted Isometry Property -- 7 Basic Tools from Probability Theory -- 8 Advanced Tools from Probability Theory -- 9 Sparse Recovery with Random Matrices -- 10 Gelfand Widths of l1-Balls -- 11 Instance Optimality and Quotient Property -- 12 Random Sampling in Bounded Orthonormal Systems -- 13 Lossless Expanders in Compressive Sensing -- 14 Recovery of Random Signals using Deterministic Matrices -- 15 Algorithms for l1-Minimization -- Appendix A Matrix Analysis -- Appendix B Convex Analysis -- Appendix C Miscellanea -- List of Symbols -- References.

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At the intersection of mathematics, engineering, and computer science sits the thriving field of compressive sensing. Based on the premise that data acquisition and compression can be performed simultaneously, compressive sensing finds applications in imaging, signal processing, and many other domains. In the areas of applied mathematics, electrical engineering, and theoretical computer science, an explosion of research activity has already followed the theoretical results that highlighted the efficiency of the basic principles. The elegant ideas behind these principles are also of independent interest to pure mathematicians. A Mathematical Introduction to Compressive Sensing gives a detailed account of the core theory upon which the field is build. Key features include: · The first textbook completely devoted to the topic of compressive sensing · Comprehensive treatment of the subject, including background material from probability theory, detailed proofs of the main theorems, and an outline of possible applications · Numerous exercises designed to help students understand the material · An extensive bibliography with over 500 references that guide researchers through the literature With only moderate prerequisites, A Mathematical Introduction to Compressive Sensing is an excellent textbook for graduate courses in mathematics, engineering, and computer science. It also serves as a reliable resource for practitioners and researchers in these disciplines who want to acquire a careful understanding of the subject.

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