Abstract
Substitution box (S-Box) has a prominent significance being the fundamental nonlinear component of block cipher which fulfils confusion, one of the properties proposed by Claude Shannon in 1949. In this paper, we proposed an S-Box by using the action of modular group PSL $\left ({2,\mathbb {Z} }\right)$ on projective line PL $\left ({F_{257} }\right)$ over Galois field GF $\left ({2^{8} }\right)$ . In the first step we obtained elements of GF $\left ({2^{8} }\right)$ by using powers of $\alpha $ , where $\alpha $ is the primitive root of irreducible polynomial $p\left ({x }\right)$ of order 8 over field $\mathbb {Z}_{2}$ , then applied the generators of PSL $\left ({2,\mathbb {Z} }\right)$ and followed steps to get rid of infinity from output. In the final step of proposed scheme, one of the permutations of $S_{16}$ is applied which enhanced the possible number of S-Boxes obtained by any single specific irreducible polynomial $p(x)$ over field $\mathbb {Z}_{2}$ of order 8. We analyzed performance of the proposed $8\times 8$ S-Box under cryptographic properties such as strict avalanche criterion, bit independence criterion, nonlinearity, differential approximation probability, linear approximation probability; and compared obtained results with a number of renowned S-Boxes. Lastly, we performed statistical analysis (which comprises of contrast analysis, homogeneity analysis, energy analysis, correlation analysis, entropy analysis and mean of absolute deviation analysis) on our proposed S-Box and obtained results have been compared with adequate number of S-Boxes.
Highlights
INTRODUCTIONIn the present era with digitally advanced technologies and excessive usage of internet, secure transmission of digital data (images, videos, audios, military/office documents, etc.) has become most essential part for secure communication
In the present era with digitally advanced technologies and excessive usage of internet, secure transmission of digital data has become most essential part for secure communication
We proposed an algorithm for construction of (8 × 8) Substitution box (S-Box) by using the action of modular group PSL(2, Z) on projective line PL(GF(28)) and involving the structure of Galois field GF(28) in a simple unique way
Summary
In the present era with digitally advanced technologies and excessive usage of internet, secure transmission of digital data (images, videos, audios, military/office documents, etc.) has become most essential part for secure communication. Strength of any block cipher is based on the strength of S-Box. a number of new techniques have been proposed for the construction of S-Box which utilized different algebraic structures such as symmetric groups, Galois fields, Galois rings, left almost semi-groups, linear fractional transformation, action of projective general linear group, action of projective special linear group and coset diagram (see [26], [35]–[41]). Authors in [45] proposed a novel algebraic technique for S-Box construction by group action on ring Z1024 Their illustrated S-Box showed some good result of nonlinearity and offset to SAC but we found that there is one fixed point which is 160. In [46], authors proposed a new algorithm by taking composition of inversion function and action of S8 symmetric group on Galois field Their illustrated S-Box found to be highly nonlinear and bijective but had four fixed points which are 0, 1, 48 and 115.
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