TY  - THES
N1  - Pembimbing M. Zaki Riyanto, M.Sc
ID  - digilib42629
UR  - https://digilib.uin-suka.ac.id/id/eprint/42629/
A1  - YUNIDA ANISA RAHAYU, NIM.: 16610025
Y1  - 2020/08/31/
N2  - Many study in structural algebra conclude that R-module is a generalization
of group and ring. As in group and ring, R-submodule, R-module homomorphism,
as well as R-module homomorphism fundamental theorem can be defined from
R-module. This study will focus on the concept of (R; S)-bimodule and (R; S)-
module as the generalization of (R; S)-bimodule.
Let R and S be rings, an abelian group M over + is called (R; S)-module
if rms is in M for all r 2 R, m 2 M and s 2 S, and satisfy distributive and
associative law. Structure (R; S) is a bimodule if there is exist central idempotent
on ring R and S. Implementation of (R; S)-module on secret key exchange is
successfully done by some modifications on Diffie-Hellman key exchange protocol
PB  - UIN SUNAN KALIJAGA YOGYAKARTA
KW  - (R; S)-Module
KW  -  Homomorphisms
KW  -  Secret key exchange
M1  - skripsi
TI  - (R; S)-MODUL DAN PENERAPANNYA PADA
KRIPTOGRAFI
AV  - restricted
EP  - 117
ER  -