Company Filing History:
Years Active: 2025
Title: The Innovations of Kiernan B George
Introduction
Kiernan B George is an accomplished inventor based in South Riding, Virginia. He has made significant contributions to the field of cryptography, particularly through his innovative patent related to block ciphers. His work exemplifies the intersection of mathematics and computer science, showcasing the potential of Galois extension fields in encryption technologies.
Latest Patents
Kiernan holds a patent for a Galois extension field-based block cipher. This patent includes various examples related to a block cipher adaptation of the Galois Extension Fields (GEF) combination technique. One notable example describes a GEF-based block encryption process that involves forming an output from a pseudorandom number generator (PRNG) into a key matrix. The key matrix is formatted as an invertible square matrix. The process applies a GEF operation to the key matrix to map elements to a closed subset in a higher-order GEF space. It also includes mapping plaintext to a plaintext matrix and applying a GEF operation to the plaintext matrix. The combination of the plaintext matrix and the key matrix produces a vector of ciphertext in the higher-order GEF space. The vector is then reduced to a reduced vector of ciphertext using an inverse of the GEF operation, with a ceiling operation applied to bijectively map elements in the reduced vector to a closed subset. Another example within the patent includes GEF-based block decryption.
Career Highlights
Kiernan is associated with Virginia Tech Intellectual Properties, Inc., where he continues to develop and refine his innovative ideas. His work in this organization has allowed him to collaborate with other experts in the field and contribute to advancements in cryptographic technologies.
Collaborations
Kiernan has worked alongside Alan J Michaels, further enhancing the collaborative efforts in his research and development projects.
Conclusion
Kiernan B George's contributions to the field of cryptography through his innovative patent demonstrate the importance of mathematical techniques in modern encryption. His work continues to influence the development of secure communication technologies.