院系:李煌数学研究院/非对称公钥加密算法

• 任取${\displaystyle 2}$个任意大的随机正整数${\displaystyle q,s,}$满足${\displaystyle (q,s)=1,q<s;}$
• 通过${\displaystyle p=sq-1}$计算出${\displaystyle p;}$
• 随机产生${\displaystyle k_{1},k_{2},k_{3}}$使三者满足${\displaystyle (k_{1},q)=1,(k_{2},q)=1,(k_{3},q)=1,}$并且通过方程${\displaystyle x_{1}q\equiv 1{\pmod {sk_{1}p}},x_{2}q\equiv 1{\pmod {sk_{1}k_{2}p}},x_{3}q\equiv 1{\pmod {sk_{1}k_{2}k_{3}p}}}$依次算出${\displaystyle x_{1},x_{2},x_{3};}$
• 公开${\displaystyle s,x_{1},x_{2},x_{3},}$保密${\displaystyle p,q,}$丢弃${\displaystyle k_{1},k_{2},k_{3};}$${\displaystyle }$
• 每次加密都随机产生${\displaystyle 4}$个大正整数${\displaystyle t,w,h,u,}$这${\displaystyle 4}$个数两两互素${\displaystyle ,}$且与${\displaystyle s,x_{1},x_{2},x_{3},}$全部都互素${\displaystyle ,}$通过加密公式${\displaystyle c=ts+wx_{1}+hx_{2}+ux_{3}+m}$计算出密文${\displaystyle c,}$随机产生密文${\displaystyle v,}$满足${\displaystyle t+w+h+u-v<m,}$加密完后丢弃${\displaystyle t,w,h,u,}$传送密文${\displaystyle c,v}$给解密方${\displaystyle ;}$
• 解密方通过私钥${\displaystyle p,q}$和解密公式${\displaystyle m={\frac {{{\bigg (}{(cq-v)}\mod p{\bigg )}}-{{\bigg (}{{\big (}(cq-v)\mod p{\big )}\mod q}{\bigg )}}}{q}}}$恢复出明文${\displaystyle m}$

• 《计算机算法基础》.李煌 著

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