03815nam 2200589 a 450 991043815490332120200520144314.01-283-62171-197866139341610-8176-8373-910.1007/978-0-8176-8373-3(CKB)2670000000242245(EBL)1030321(OCoLC)811059043(SSID)ssj0000767024(PQKBManifestationID)11436181(PQKBTitleCode)TC0000767024(PQKBWorkID)10732100(PQKB)10878282(DE-He213)978-0-8176-8373-3(MiAaPQ)EBC1030321(PPN)168288664(EXLCZ)99267000000024224520120906d2013 uy 0engur|n|---|||||txtccrFinite frames theory and applications /Peter G. Casazza, Gitta Kutyniok, editors1st ed. 2013.[New York] Birkhauserc20131 online resource (491 p.)Applied and numerical harmonic analysisDescription based upon print version of record.0-8176-8372-0 Includes bibliographical references and index.Introduction -- Constructing Finite Frames with a Given Spectrum.-Spanning and Independence Properties of Finite.-Alegebraic Geometry and Finite Frames -- Group Frames -- Gabor Framses in Finite Dimensions -- Frames as Codes -- Quantization and Finite Frames -- Finite Frames for Sparse Signal Processing -- Finite Frames and Filter Banks -- Finite Frame theory in Pure Mathematics -- Probabilitstic Frames -- Fusion Frames.Hilbert space frames have long served as a valuable tool for signal and image processing due to their resilience to additive noise, quantization, and erasures, as well as their ability to capture valuable signal characteristics.  More recently, finite frame theory has grown into an important research topic in its own right, with a myriad of applications to pure and applied mathematics, engineering, computer science, and other areas.  The number of research publications, conferences, and workshops on this topic has increased dramatically over the past few years, but no survey paper or monograph has yet appeared on the subject. Edited by two of the leading experts in the field, Finite Frames aims to fill this void in the literature by providing a comprehensive, systematic study of finite frame theory and applications.  With carefully selected contributions written by highly experienced researchers, it covers topics including: * Finite Frame Constructions; * Optimal Erasure Resilient Frames; * Quantization of Finite Frames; * Finite Frames and Compressed Sensing; * Group and Gabor Frames; * Fusion Frames. Despite the variety of its chapters' source and content, the book's notation and terminology are unified throughout and provide a definitive picture of the current state of frame theory. With a broad range of applications and a clear, full presentation, this book is a highly valuable resource for graduate students and researchers across disciplines such as applied harmonic analysis, electrical engineering, quantum computing, medicine, and more.  It is designed to be used as a supplemental textbook, self-study guide, or reference book.Applied and Numerical Harmonic Analysis,2296-5009Frames (Vector analysis)Frames (Vector analysis)515.733Casazza Peter G55468Kutyniok Gitta472510MiAaPQMiAaPQMiAaPQBOOK9910438154903321Finite frames4201256UNINA01008nam0 22002773i 450 VAN0010583920240806100729.62302-01-53771-020160610d1995 |0itac50 baengUS|||| |||||Foundations of databasesSerge Abiteboul, Richard Hull, Victor VianuReading [etc.]Addison-Wesley1995XVIII, 685 p.24 cm.Archivi di datiVANC032505EC005.721AbiteboulSergeVANV082242315264HullRichardVANV082243243686VianuVictorVANV082244721367ITSOL20240906RICABIBLIOTECA DEL DIPARTIMENTO DI ECONOMIAIT-CE0106VAN03VAN00105839BIBLIOTECA DEL DIPARTIMENTO DI ECONOMIA03PREST VCe3 03 32513 20160610 Foundations of databases1413530UNICAMPANIA