02902nam 22005655 450 991098304640332120250626164105.09789819767229981976722910.1007/978-981-97-6722-9(CKB)36357457800041(MiAaPQ)EBC31728421(Au-PeEL)EBL31728421(DE-He213)978-981-97-6722-9(OCoLC)1465271386(EXLCZ)993635745780004120241016d2025 u| 0engur|||||||||||txtrdacontentcrdamediacrrdacarrierQuantum Nonlinear Function Obfuscation Theory and Application /by Tao Shang1st ed. 2025.Singapore :Springer Nature Singapore :Imprint: Springer,2025.1 online resource (269 pages)9789819767212 9819767210 Introduction -- Preliminary -- Quantum point obfuscation -- Quantum power obfuscation -- Quantum symmetric encryption -- Quantum asymmetric encryption -- Quantum homomorphic encryption -- Quantum one-way function -- Quantum access control -- Quantum zero-knowledge proof.This book summarizes the main research results and preliminaries of quantum obfuscation and systematically introduces quantum obfuscation methods. Quantum obfuscation is an important and cross-cutting research topic in quantum cryptography and quantum computation. Quantum cryptography and quantum computation have made great progress in this century. However, academic research on the theory of quantum obfuscation is still at a blank stage. The author combines the theory of quantum computation and obfuscation and develop the theory of quantum obfuscation. Until now, a series of representative schemes have been proposed. From the viewpoint of quantum nonlinear function obfuscation, the author designs a series of quantum obfuscation schemes by means of combining obfuscation theory with quantum computation. Furthermore, the author describes the quantum cryptographic protocols based on quantum obfuscation. These methods will provide effective tools for the research and application of quantum cryptography.Quantum computersCryptographyData encryption (Computer science)Quantum ComputingCryptologyQuantum computers.Cryptography.Data encryption (Computer science)Quantum Computing.Cryptology.006.3843530.12Shang Tao1058989MiAaPQMiAaPQMiAaPQBOOK9910983046403321Quantum Nonlinear Function Obfuscation Theory and Application4316033UNINA