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PARI/GP
? polgalois(256*x^8-512*x^6+304*x^4-48*x^2+1)
%1 = [8, 1, 2, "4[x]2"]
C2×C4
$\xymatrix { &C_2\times C_4 \\ C_4\ar@[red][ur]&C_2^2\ar@[red][u ]&C_4\ar@[red][ul] \\
C_2\ar@[red][ur]&C_2\ar@[red][ul]\ar@[red][u ]\ar@[red][ur]&C_2\ar@[red][ul] \\
&C_1\ar@[red][u ]\ar@[red][ul]\ar@[red][ur]}$
按照$\Bbb Z^\times_{40}/\{\pm1\}$乘法写出:
$\xymatrix { &\{\{\pm1\},\{\pm3\},\{\pm7\},\{\pm9\},\{\pm11\},\{\pm13\},\{\pm17\},\{\pm19\}\}\\ \{\{\pm1\},\{\pm3\},\{\pm9\},\{\pm13\}\}\ar@[red][ur]&\{\{\pm1\},\{\pm9\},\{\pm11\},\{\pm19\}\}\ar@[red][u ]&\{\{\pm1\},\{\pm7\},\{\pm9\},\{\pm17\}\}\ar@[red][ul] \\
\{\{\pm1\},\{\pm11\}\}\ar@[red][ur]&\{\{\pm1\},\{\pm9\}\}\ar@[red][ul]\ar@[red][u ]\ar@[red][ur]&\{\{\pm1\},\{\pm19\}\}\ar@[red][ul] \\
&\{\{\pm1\}\}\ar@[red][u ]\ar@[red][ul]\ar@[red][ur]}$
写出$\zeta$的幂的和:
如果和为0,用它们的乘积,如$(\zeta+\zeta^{-1})(\zeta^{19}+\zeta^{-19})$
$\xymatrix { &ℚ(\zeta+\zeta^{-1}+\zeta^3+\zeta^{-3}+\zeta^7+\zeta^{-7}+\zeta^9+\zeta^{-9}+\zeta^{11}+\zeta^{-11}+\zeta^{13}+\zeta^{-13}+\zeta^{17}+\zeta^{-17}+\zeta^{19}+\zeta^{-19}) \\ ℚ(\zeta+\zeta^{-1}+\zeta^3+\zeta^{-3}+\zeta^9+\zeta^{-9}+\zeta^{13}+\zeta^{-13})\ar@{<-}@[red][ur]& ℚ((\zeta+\zeta^{-1})(\zeta^9+\zeta^{-9})(\zeta^{11}+\zeta^{-11})(\zeta^{19}+\zeta^{-19}))\ar@{<-}@[red][u ]& ℚ(\zeta+\zeta^{-1}+\zeta^7+\zeta^{-7}+\zeta^9+\zeta^{-9}+\zeta^{17}+\zeta^{-17})\ar@{<-}@[red][ul] \\ ℚ(\zeta+\zeta^{-1}+\zeta^{11}+\zeta^{-11})\ar@{<-}@[red][ur]&ℚ(\zeta+\zeta^{-1}+\zeta^9+\zeta^{-9})\ar@{<-}@[red][ul]\ar@{<-}@[red][u ]\ar@{<-}@[red][ur]&ℚ((\zeta+\zeta^{-1})(\zeta^{19}+\zeta^{-19}))\ar@{<-}@[red][ul]
\\&ℚ(\zeta+\zeta^{-1})\ar@{<-}@[red][ul]\ar@{<-}@[red][u ]\ar@{<-}@[red][ur]}$
代数化简:
$\zeta+\zeta^{-1}+\zeta^3+\zeta^{-3}+\zeta^9+\zeta^{-9}+\zeta^{13}+\zeta^{-13}$
$(\zeta+\zeta^{-1})(\zeta^9+\zeta^{-9})(\zeta^{11}+\zeta^{-11})(\zeta^{19}+\zeta^{-19})$
$\zeta+\zeta^{-1}+\zeta^7+\zeta^{-7}+\zeta^9+\zeta^{-9}+\zeta^{17}+\zeta^{-17}$
$\zeta+\zeta^{-1}+\zeta^{11}+\zeta^{-11}$
$\zeta+\zeta^{-1}+\zeta^9+\zeta^{-9}$
$(\zeta+\zeta^{-1})(\zeta^{19}+\zeta^{-19})$
$\xymatrix { &ℚ \\ ℚ(\sqrt{10})\ar@{<-}@[red][ur]& ℚ(\sqrt5)\ar@{<-}@[red][u ]& ℚ(\sqrt2)\ar@{<-}@[red][ul] \\ ℚ(\sqrt{5-\sqrt{5}})\ar@{<-}@[red][ur]&ℚ(\sqrt{3+\sqrt{5}})\ar@{<-}@[red][ul]\ar@{<-}@[red][u ]\ar@{<-}@[red][ur]&ℚ(\sqrt{\frac{5+\sqrt5}2})\ar@{<-}@[red][ul]
\\&ℚ(\frac{1}{2} \sqrt{2+\sqrt{\frac{5+\sqrt{5}}{2}}})\ar@{<-}@[red][ul]\ar@{<-}@[red][u ]\ar@{<-}@[red][ur]}$
其中$2\sqrt{3+\sqrt5}=\sqrt2+\sqrt{10}$,所以$\Bbb Q(\sqrt{3+\sqrt5})=\Bbb Q(\sqrt2,\sqrt5)=\Bbb Q(\sqrt2,\sqrt{10})=\Bbb Q(\sqrt5,\sqrt{10})$ |
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Czhang271828
发表于 2024-6-11 13:43
