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emiliocba
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I want to know about reference of formulas for $$ L(s,D)=\sum_{n=1}^\infty \left(\frac{D}{n}\right)\,n^{-s} $$ for $s$ a positive integer number and $D$ a fundamental discriminant. For $n=1$$s=1$ we have the Dirichlet class number formula.

I would like to have some reference for $n\geq3$$s\geq2$. Thanks.-.

I want to know about reference of formulas for $$ L(s,D)=\sum_{n=1}^\infty \left(\frac{D}{n}\right)\,n^{-s} $$ for $s$ a positive integer number and $D$ a fundamental discriminant. For $n=1$ we have the Dirichlet class number formula.

I would like to have some reference for $n\geq3$. Thanks.-.

I want to know about reference of formulas for $$ L(s,D)=\sum_{n=1}^\infty \left(\frac{D}{n}\right)\,n^{-s} $$ for $s$ a positive integer number and $D$ a fundamental discriminant. For $s=1$ we have the Dirichlet class number formula.

I would like to have some reference for $s\geq2$. Thanks.-.

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emiliocba
  • 2.4k
  • 19
  • 26

Values of Dirichlet L-funcions at natural numbers

I want to know about reference of formulas for $$ L(s,D)=\sum_{n=1}^\infty \left(\frac{D}{n}\right)\,n^{-s} $$ for $s$ a positive integer number and $D$ a fundamental discriminant. For $n=1$ we have the Dirichlet class number formula.

I would like to have some reference for $n\geq3$. Thanks.-.