Title of article
A modified public key cryptography based on generalized Lucas matrices
Author/Authors
Prasad ، Kalika Department of Mathematics - Central University of Jharkhand , Kumari ، Munesh Department of Mathematics - Central University of Jharkhand , Mahato ، Hrishikesh Department of Mathematics - Central University of Jharkhand
From page
665
To page
679
Abstract
In this paper, we propose a generalized Lucas matrix (a recursive matrix of higher order) obtained from the generalized Fibonacci sequences. We obtain their algebraic properties such as direct inverse calculation, recursive nature, etc. Then, we propose a modified public key cryptography using the generalized Lucas matrices as a key element that optimizes the keyspace construction complexity. Furthermore, we establish a key agreement for encryption-decryption with a combination of the terms of generalized Lucas sequences under the residue operation.
Keywords
Affine , Hill cipher , Cryptography , Fibonacci sequence , Lucas sequence , Lucas matrix
Journal title
Communications in Combinatorics and Optimization
Journal title
Communications in Combinatorics and Optimization
Record number
2780628
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