디리클레 L-함수의 미분
이 항목의 스프링노트 원문주소==
개요==
리만제타함수==
디리클레 L-함수의 미분==
- \(d_K\)를 판별식으로 갖는 복소이차수체 \(K\)에 대하여, 디리클레 L-함수는 다음을 만족시킴
\(L_{d_K}'(1)=\frac{2\pi h_K(\gamma+\ln 2\pi)}{w_K \cdot \sqrt{|d_K|}}-\frac{\pi}{\sqrt{|d_K|}}\sum_{(a,d_K)=1}\chi(a)\log\Gamma (\frac{a}{|d_K|})\)
\(L_{d_K}'(1)=\frac{2\pi h_K(\gamma+\ln 2\pi)}{w_K \cdot \sqrt{|d_K|}}-\frac{\pi}{\sqrt{|d_K|}}\sum_{(a,d_K)=1}\chi(a)\log\Gamma (\frac{a}{|d_K|})\)
예==
- 디리클레 베타함수
\(K=\mathbb{Q}(i)\)
\(\beta'(1)=L_{-4}'(1)=\frac{\pi}{4}(\gamma+\ln 2\pi)-\frac{\pi}{2}\ln(\frac{\Gamma(1/4)}{\Gamma(3/4)})\)
- \(K=\mathbb{Q}(\omega)\), \(\omega^2+\omega+1=0\)
\(L_{-3}'(1)=\frac{\pi}{3\sqrt{3}}(\gamma+\ln 2\pi)-\frac{\pi}{\sqrt{3}}\ln(\frac{\Gamma(1/3)}{\Gamma(2/3)})\)
\(K=\mathbb{Q}(i)\)
\(\beta'(1)=L_{-4}'(1)=\frac{\pi}{4}(\gamma+\ln 2\pi)-\frac{\pi}{2}\ln(\frac{\Gamma(1/4)}{\Gamma(3/4)})\)
\(L_{-3}'(1)=\frac{\pi}{3\sqrt{3}}(\gamma+\ln 2\pi)-\frac{\pi}{\sqrt{3}}\ln(\frac{\Gamma(1/3)}{\Gamma(2/3)})\)