The Diffie-Hellman Protocol (ft. Serge Vaudenay) The Diffie-Hellman Protocol (ft. Serge Vaudenay) begin-post-stats ZettaBytes, EPFL • 2K views end-post-stats begin-duration 9:33 end-duration Math topics: _Group_theory_##Group theory##_Generating_set_of_a_group_##Generating set of a group##_Modular_arithmetic_##Modular arithmetic##_Presentation_of_a_group_##Presentation of a group##_Binary_operations_##Binary operations##_Multiplication_##Multiplication##_Identity_element_##Identity element##_Remainder_##Remainder##_Properties_of_groups_##Properties of groups##_Cyclic_group_##Cyclic group##_100_(number)_##100 (number)##_Finite_group_##Finite group##_Complex_analysis_##Complex analysis##_Logarithm_##Logarithm##_Pi_##Pi##_Elliptic_curve_##Elliptic curve##_Numeral_systems_##Numeral systems##_Prime_number_##Prime number##_Numerical_digit_##Numerical digit##_Euclidean_division_##Euclidean division Other topics: _Cryptography_##Cryptography##_Cryptography_##Cryptography##_Serge_Vaudenay_##Serge Vaudenay##_One-way_function_##One-way function##_Key_(cryptography)_##Key (cryptography)##_Mathematical_logic_##Mathematical logic##_Symmetric-key_algorithm_##Symmetric-key algorithm##_Algorithm_##Algorithm##_Finite_set_##Finite set video-id: kOlCU4not0s channel_ZettaBytes,_EPFL_ So What Learning Binary operations , Complex analysis , Cryptography , Group theory , Mathematical logic , Numeral systems , Properties of groups Saturday, January 20, 2018 Share Share
