GF(2^3)本原多项式 : g(x) = x^4 + a^3*x^3 + x^2 + a^x + a^3
元素如下表
Elemen | Polynomial |a2 a1 a0
0 | 0 | 0 0 0
a^0 | 1 | 0 0 1
a^1 | a^1 | 0 1 0
a^2 | a^2 | 1 0 0
a^3 | a^+1 | 0 1 1
a^4 | a^(a^+1)= a^2+a | 1 1 0
a^5 | a^3+a^2=a^2+a^+1 | 1 1 1
a^6 | a^2+1 | 1 0 1
输入序列为 a^2 a^3 a^4 Elemen | Polynomial |a2 a1 a0
0 | 0 | 0 0 0
a^0 | 1 | 0 0 1
a^1 | a^1 | 0 1 0
a^2 | a^2 | 1 0 0
a^3 | a^+1 | 0 1 1
a^4 | a^(a^+1)= a^2+a | 1 1 0
a^5 | a^3+a^2=a^2+a^+1 | 1 1 1
a^6 | a^2+1 | 1 0 1
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