Parametrization of generalized triangle groups and construction of substitution-box for medical image encryption
Aqsa Zafar Abbasi, Ayesha Rafiq, Lioua Kolsi
Abstract
The construction of strong encryption techniques is crucial to meet the increasing demand for secure transmission as well as storage of medical images. As substitution box (S-Box) is an incredibly important component of block ciphers. Nonlinearity is an important attribute to consider while designing secure S-boxes. As a result, it is required to create new approaches for producing S-boxes with high non-linearity scores. We present a method of parametrization of the generalized triangle group 〈x,y|x2=y5=wk=1〉 as linear groups, where w=xyxy2xy4 which is extended by the parametrization for triangle group 〈x,y,t|x2=y5=t2=(xt)2=(yt)2=(xy)k=1〉. This parametrization is then used for the construction of a highly nonlinear and secure substitution box designed for 28 elements, tailored specifically for the finite generalized triangle group case with k=2 for θ=64 which is parameter for all homomorphism from H5 to PSL(2,q), possessing an order of 1200. We rigorously evaluate and analyze various common security indicators associated with the proposed substitution box. The proposed S-box is evaluated for picture encryption using various statistical approaches. Comparative analysis and additional scrutiny reveal promising attributes, affirming its suitability, efficacy, and potential applicability in the domain of medical image encryption. Our S-box achieves the necessary conditions for secure communication as well as image encryption, as confirmed by positive examination results.