New Public-key Quantum Signature Scheme with Quantum One-Way Function

Based on the asymmetric quantum cryptosystem, a new public-key quantum signature scheme is proposed. In our scheme, the signer’s public key is derived from her public identity information, and the corresponding private key is generated by the trusted private key generator (PKG). Both of the public key and the private key are classical bit strings, so they are easily kept. It is very convenient for the key management of the quantum signature system. The signer signs a message with her private key, and the quantum signature can be publicly verified with the signer’s public key and the quantum one-way function. Both of the private key and public key can be reused. On the other hand, in the signing phase, the signer sends the message to PKG via a classical unencrypted channel, which can be used to authenticate the identity of the signer. The proposed scheme has the properties of completeness, information-theoretic security, non-repudiation and unforgeability. Its information-theoretic security is ensured by quantum indistinguishability mechanics. On the other hand, our scheme is more efficient than the similar schemes.

[1]  Stephen Wiesner,et al.  Conjugate coding , 1983, SIGA.

[2]  Li-Hua Gong,et al.  High-Efficient Arbitrated Quantum Signature Scheme Based on Cluster States , 2017 .

[3]  I. Chuang,et al.  Quantum Computation and Quantum Information: Bibliography , 2010 .

[4]  Wen Qiao-Yan,et al.  Cryptanalysis of the arbitrated quantum signature protocols , 2011 .

[5]  R. Cleve,et al.  Quantum fingerprinting. , 2001, Physical review letters.

[6]  Claude E. Shannon,et al.  Communication theory of secrecy systems , 1949, Bell Syst. Tech. J..

[7]  M. Luo,et al.  Quantum Signature Scheme with Weak Arbitrator , 2012 .

[8]  V. Roychowdhury,et al.  Optimal encryption of quantum bits , 2000, quant-ph/0003059.

[9]  Adi Shamir,et al.  Identity-Based Cryptosystems and Signature Schemes , 1984, CRYPTO.

[10]  Weizhong Zhao,et al.  On the security of arbitrated quantum signature schemes , 2012, 1205.3265.

[11]  Peter W. Shor,et al.  Polynomial-Time Algorithms for Prime Factorization and Discrete Logarithms on a Quantum Computer , 1995, SIAM Rev..

[12]  Qi Su,et al.  Improved Quantum Signature Scheme with Weak Arbitrator , 2013 .

[13]  Alfred Menezes,et al.  Handbook of Applied Cryptography , 2018 .

[14]  Jongin Lim,et al.  Comment on “Quantum Signature Scheme with Weak Arbitrator” , 2014 .

[15]  Ying Sun,et al.  Reexamination of arbitrated quantum signature: the impossible and the possible , 2013, Quantum Inf. Process..

[16]  Liang Chen,et al.  Uncertainty relations with the generalized Wigner–Yanase–Dyson skew information , 2018, Quantum Inf. Process..

[17]  Fang Yu,et al.  Security Problems in the Quantum Signature Scheme with a Weak Arbitrator , 2014 .

[18]  Qin Li,et al.  Arbitrated quantum signature scheme using Bell states , 2009 .

[19]  Wei-Wei Zhang,et al.  Improving the security of arbitrated quantum signature against the forgery attack , 2013, Quantum Inf. Process..

[20]  Ying Guo,et al.  Network-based Arbitrated Quantum Signature Scheme with Graph State , 2017 .

[21]  Daowen Qiu,et al.  Security analysis and improvements of arbitrated quantum signature schemes , 2010 .

[22]  Gilles Brassard,et al.  Quantum cryptography: Public key distribution and coin tossing , 2014, Theor. Comput. Sci..

[23]  Guihua Zeng,et al.  Novel qubit block encryption algorithm with hybrid keys , 2007 .

[24]  Yang Li,et al.  Quantum probabilistic encryption scheme based on conjugate coding , 2012, China Communications.

[25]  Ke-Jia Zhang,et al.  Security Weaknesses in Arbitrated Quantum Signature Protocols , 2014 .

[26]  C. Hong,et al.  Quantum Signature Scheme Using a Single Qubit Rotation Operator , 2015 .

[27]  Sugen Chen,et al.  Public-key quantum digital signature scheme with one-time pad private-key , 2017, Quantum Information Processing.

[28]  Guihua Zeng,et al.  Arbitrated quantum-signature scheme , 2001, quant-ph/0109007.

[29]  Ying Guo,et al.  Arbitrated Quantum Signature Scheme with Continuous-Variable Coherent States , 2016 .

[30]  Li Yang,et al.  Quantum public-key encryption protocols with information-theoretic security , 2012, Photonics Europe.

[31]  Chunhui Wu,et al.  On the Existence of Quantum Signature for Quantum Messages , 2013, 1302.4528.