Related-key secure key encapsulation from extended computational bilinear Diffie–Hellman
, 2017 Baodong Qin +4 more
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Group Security Authentication and Key Agreement Protocol Built by Elliptic Curve Diffie Hellman Key Exchange for LTE Military Grade Communication [PDF]
, 2022 Karim H. Moussa +3 more
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Improved ciphertext-policy time using short elliptic curve Diffie–Hellman
, 2023 Pongpisit Wuttidittachotti +1 more
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A Novel Key Distribution for Mobile Patient Authentication Inspired by the Federated Learning Concept and Based on the Diffie-Hellman Elliptic Curve. [PDF]
Sensors (Basel)AbuAlghanam O +4 more
europepmc +1 more source
Enhancing security in Wireless Body Area Networks (WBANs) with ECC-based Diffie-Hellman Key Exchange algorithm (ECDH). [PDF]
Technol Health CareS S A, Devprasad KD, J RS.
europepmc +1 more source
Efficient and Secure Cloud Storage Auditing Based on the Diffie-Hellman Key Exchange
, 2019 Rokesh Kumar Yarava, Rajendra Singh
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Diffie-Hellman Key Based Authentication in Proxy Mobile IPv6 [PDF]
, 2010 Hyungon Kim, Jong‐Hyouk Lee
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Performance analysis: Securing SIP on multi-threaded/multi-core proxy server using public keys on Diffie-Hellman (DH) in single and multi-server queuing scenarios. [PDF]
PLoS OneBhatti DS +6 more
europepmc +1 more source
, 2014 So far in this series we've seen elliptic curves from many perspectives, including the elementary, algebraic, and programmatic ones. We implemented finite field arithmetic and connected it to our elliptic curve code. So we're in a perfect position to feast on the main course: how do we use elliptic curves to actually do cryptography?
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