다이로그 항등식 (dilogarithm identities)

개요

\[\sum_{i=1}^{N}L(x_i)=cL(1)\]

원분다항식 (단위근에 대한 원분다항식(cyclotomic polynomial) 과는 의미가 다르나 이미 용어가 굳어져 널리 사용됨)\[\prod_{r}(1-x^r)^{e_r}=x^{e_0}\] 여기서 \(e_i\) 는 정수, \(r\)은 자연수
대응되는 dilogarithm 항등식\[\sum_{r}\frac{e_r}{r}L(x^r)=cL(1)\] 여기서 c 는 유리수

오일러\[L(1)=\frac{\pi^2}{6}\]\[-2L(-1)=L(1)\]\[2L(\frac{1}{2})=L(1)\]
Lewin\[L(\frac{1}{2^6})-2L(\frac{1}{2^3})-6L(\frac{1}{2^2})+2L(1)=0\]\[L(\frac{1}{3^2})-6L(\frac{1}{3})+2L(1)=0\]
???\[2 L\left(\frac{1}{p}\right)+\sum _{j=2}^{p-1} L\left(\frac{1}{j^2}\right)=L(1)\]

란덴\[5L(\frac{3-\sqrt{5}}{2})=2L(1)\]\[5L(\frac{-1+\sqrt{5}}{2})=3L(1)\]
콕세터(1935)\[\rho=\tfrac{1}{2}(\sqrt{5}-1)\] 는 황금비\[L(\rho^6)=4L(\rho^3)+3L(\rho^2)-6L(\rho)+\frac{7\pi^2}{30}\]\[L(\rho^{12})=2L(\rho^6)+3L(\rho^4)+4L(\rho^3)-6L(\rho^2)+\frac{7\pi^2}{10}\]\[L(\rho^{20})=2L(\rho^{10})+15L(\rho^4)-10L(\rho^2)+\frac{\pi^2}{5}\]
Lewin\[L(\rho^{24})=6L(\rho^{8})+8L(\rho^6)-6L(\rho^4)+\frac{\pi^2}{30}\]
Lewin\[x=\frac{\sqrt{13}-3}{2}\]\[L(x^6)-4L(x^3)-6L(x^2)+24L(x)=7L(1)\]
Browkin\[x=\frac{\sqrt{13}-1}{6}, z=\frac{\sqrt{13}+1}{6}\]\[L(x^6)-6L(x^3)+L(x^2)+18L(x)=8L(1)\]\[L(z^6)-3L(z^3)-6L(z^2)+9L(z)=2L(1)\]
르장드르 카이 함수\[L(\sqrt{2}-1)-4L((\sqrt{2}-1)^2)=\frac{\pi^2}{4}\]\[L(\frac{\sqrt{5}-1}{2})-4L((\frac{\sqrt{5}-1}{2})^2)=\frac{\pi^2}{3}\]\[L(\sqrt{5}-2)-4L((\sqrt{5}-2)^2)=\frac{\pi^2}{6}\]
Loxton\[x=\frac{\sqrt{3}-1}{2}\]\[12L(\beta)+3L(\beta^{2})-2L(\beta^{3})=\frac{5\pi^{2}}{6}\]

왓슨 \(\alpha, -\beta, -\gamma^{-1}\) 가 방정식\(x^3+2x^2-x-1=0\) 의 해라고 하자.\[7L(\alpha^2)-7L(\alpha)+L(1)=0\]\[7L(\beta^2)+14L(\beta)-10L(1)=0\]\[7L(\gamma^2)+14L(\gamma)-8L(1)=0\]
Loxton & Lewin \(x, -y, -z^{-1}\)가 방정식 \(x^3+3x^2-1=0\)의 해라고 하자.\[3L(x^3)-9L(x^2)-9L(x)+7L(1)=0\]\[3L(y^6)-6L(y^3)-27L(y^2)+18L(y)+2L(1)=0\]\[3L(z^6)-6L(z^3)-27L(z^2)+18L(z)-2L(1)=0\]
Gordon & McIntosh \(a, -b, -c^{-1}\)가 방정식 \(x^3+6x^2+3x-1=0\)의 해라고 하자.\[2L(a^3)-2L(a^2)-11L(a)+3L(1)=0\]\[2L(b^6)-4L(b^3)-15L(b^2)+22L(b)-6L(1)=0\]\[2L(c^6)-4L(c^3)-15L(c^2)+22L(c)-4L(1)=0\]

Gordon & McIntosh \(\delta=(\sqrt{3+2\sqrt{5}}-1)/2\) 는 방정식 \(x^4+2x^3-x-1=0\)의 해\[5L(\delta^3)-5L(\delta)+L(1)=0\]\[L(\delta^{12})-2L(\delta^6)-6L(\delta^4)+4L(\delta^3)+3L(\delta^2)+4L(\delta)-4L(1)=0\]

\(\sum_{i=1}^{k}L(\frac{\sin^2\frac{\pi}{k+2}}{\sin^2\frac{(i+1)\pi}{k+2}})=\frac{3k}{k+2}\cdot\frac{\pi^2}{6}\)

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