TY - BOOK AU - B.Guedes,ElloĆ” AU - de Assis,Francisco Marcos AU - Medeiros,Rex A.C. ED - SpringerLink (Online service) TI - Quantum Zero-Error Information Theory SN - 9783319427942 AV - QA268 U1 - 003.54 23 PY - 2016/// CY - Cham PB - Springer International Publishing, Imprint: Springer KW - Computer science KW - Coding theory KW - Mathematical statistics KW - Quantum computers KW - Quantum physics KW - Computer Science KW - Coding and Information Theory KW - Probability and Statistics in Computer Science KW - Quantum Computing KW - Quantum Physics N1 - Introduction -- Fundamentals of Quantum Information Processing -- Fundamentals of Information Theory -- Classical Zero-Error Information Theory -- Zero-Error Capacity of Quantum Channels -- Zero-Error Secrecy Capacity -- Zero-Error Accessible Information of a Quantum Source -- Recent Developments in Quantum Zero-Error Information Theory N2 - This book aims at presenting the field of Quantum Information Theory in an intuitive, didactic and self-contained way, taking into account several multidisciplinary aspects. Therefore, this book is particularly suited to students and researchers willing to grasp fundamental concepts in Quantum Computation and Quantum Information areas. The field of Quantum Information Theory has evolved significantly over the last three decades. Many results from classical information theory were translated and extended to a scenario where quantum effects become important. Most of the results in this area allows for an asymptotically small probability of error to represent and transmit information efficiently. Claude E.Shannon was the first scientist to realize that error-free classical information transmission can be accomplished under certain conditions. More recently, the concept of error-free classical communication was translated to the quantum context. The so-called Quantum Zero-Error Information Theory completes and extends the Shannon Zero-Error Information Theory UR - http://148.231.10.114:2048/login?url=http://dx.doi.org/10.1007/978-3-319-42794-2 ER -