Almost perfect nonlinear (APN) functions play a pivotal role in cryptography, particularly in securing symmetric key algorithms against differential attacks. Their algebraic properties, including ...

Boolean functions form the backbone of modern cryptographic systems, serving as essential components in the design of stream ciphers, block ciphers, and other security protocols. Their inherent ...

When the logarithmic function is approximated by sequences of algebraic functions, similar questions can be posed as in the case of other similar problems. So, for example, it is interesting to ...

A potential standard for securing network-connected pacemakers, automobiles, and other lightweight devices has suffered a potentially game-over setback after researchers developed a practical attack ...

In this paper, we will obtain new algebraic transformations of the 2 F 1 -hypergeometric functions. The main novelty in our approach is the interpretation of identities among 2 F 1 -hypergeometric ...

A polynomial is an algebraic expression involving many terms and can be factorised using long division or synthetic division. Laws of logarithms and exponents Revise what logarithms are and how to use ...

Composite functions are made when the output from one function is used as the input of another function. The names of the functions are written next to each other, with the function that is used first ...

From zero to the Fibonacci sequence, ancient Indian scholars like Baudhayana, Brahmagupta, and Madhava pioneered groundbreaking mathematics centuries before Europe.

Widely influential algebraic topologist and homotopy theorist Jack Morava, professor in the Department of Mathematics at Johns Hopkins University for nearly four decades, died in Boston on Aug. 1 ...