Title :
Relationship between Lucas Sequences and Gaussian Integers in Cryptosystems
Author_Institution :
Comput. Sci. Dept., New Jersey Inst. of Technol., Newark, NJ, USA
Abstract :
Both Gaussian integers and Lucas sequences have been applied in cryptography. This paper presents the mathematical relationship between Lucas sequences and Gaussian integers. It also explores the complexity of Discrete Logarithm Problem (DLP) for Gaussian integers modulo prime by reducing it to Lucas Sequences DLP and real integer DLP. We demonstrate that the algorithms based on the Gaussian Integer DLP have advantages over the corresponding algorithms based on real integer DLP or Lucas Sequences DLP. Numerical examples are provided.
Keywords :
cryptography; sequences; DLP; Gaussian integer modulo prime; Lucas sequences; cryptosystems; discrete logarithm problem; Algorithm design and analysis; Complexity theory; Computers; Information technology; Public key cryptography; Cryptography; Gaussian integers; Gaussian primes; Lucas sequences; discrete logarithm problem;
Conference_Titel :
Information Technology - New Generations (ITNG), 2015 12th International Conference on
Conference_Location :
Las Vegas, NV
Print_ISBN :
978-1-4799-8827-3
DOI :
10.1109/ITNG.2015.43
