Company Filing History:
Years Active: 2015
Title: Innovations of Nicholas Dallman in Quantum Key Distribution
Introduction
Nicholas Dallman is an accomplished inventor based in Santa Fe, NM (US). He has made significant contributions to the field of quantum communication, particularly in the area of quantum key distribution. His innovative work has the potential to enhance secure communication methods in various applications.
Latest Patents
Dallman's most notable patent is titled "Quantum key distribution using card, base station and trusted authority." This patent describes techniques and tools for quantum key distribution (QKD) between a quantum communication (QC) card, a base station, and a trusted authority. In his implementation, the QC card contains a miniaturized QC transmitter and connects with a base station. The base station not only provides a network connection with the trusted authority but also supplies electric power to the QC card. After authentication by the trusted authority, the QC card acquires keys through QKD, which can be utilized for secure communication, authentication, access control, and other purposes. The QC card can be integrated into smartphones or other mobile devices, or it can function as a fillgun for key distribution. Dallman holds 1 patent in this innovative area.
Career Highlights
Nicholas Dallman is currently employed at Los Alamos National Security, LLC, where he continues to work on cutting-edge technologies in quantum communication. His expertise and innovative mindset have positioned him as a valuable asset in the field.
Collaborations
Dallman has collaborated with notable colleagues, including Jane Elizabeth Nordholt and Richard John Hughes. Their combined efforts contribute to advancements in quantum technologies and secure communication methods.
Conclusion
Nicholas Dallman's work in quantum key distribution represents a significant advancement in secure communication technologies. His innovative patent and contributions to the field highlight his role as a leading inventor in quantum communication.