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Date(投稿日時):Subject(見出し):From(投稿者):
34642011/08/27Re: ζ(s),DL(s,χ),_{amodN(s)},ζ(s,x)の複素平面上での正則性・有理型性・解析接続可能性の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34632011/08/08Re: L(r,χ)=1/(r-1)!・(-2πi/N)^r・1/2Σ_{a∈Z_N^×}χ(a)h_r(ζ_N^a)の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34622011/08/02Re: ζ(s),DL(s,χ),_{amodN(s)},ζ(s,x)の複素平面上での正則性・有理型性・解析接続可能性の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34612011/07/26Re: L(r,χ)=1/(r-1)!・(-2πi/N)^r・1/2Σ_{a∈Z_N^×}χ(a)h_r(ζ_N^a)の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34602011/07/22Re: ζ(1-r,x)=-rB_r(x) (where x∈C)とζ_{amodN}(1-r)=-1/r N^{r-1}B_r(a/N)を示せchiaki@kit.ac.jp (Tsukamoto Chiaki)
34592011/07/18Re: ζ(s),DL(s,χ),_{amodN(s)},ζ(s,x)の複素平面上での正則性・有理型性・解析接続可能性の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34582011/07/17Re: L(r,χ)=1/(r-1)!・(-2πi/N)^r・1/2Σ_{a∈Z_N^×}χ(a)h_r(ζ_N^a)の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34572011/07/11Re: ζ(1-r,x)=-rB_r(x) (where x∈C)とζ_{amodN}(1-r)=-1/r N^{r-1}B_r(a/N)を示せchiaki@kit.ac.jp (Tsukamoto Chiaki)
34562011/07/08Re: L(r,χ)=1/(r-1)!・(-2πi/N)^r・1/2Σ_{a∈Z_N^×}χ(a)h_r(ζ_N^a)の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34552011/07/06Re: ζ(1-r,x)=-rB_r(x) (where x∈C)とζ_{amodN}(1-r)=-1/r N^{r-1}B_r(a/N)を示せchiaki@kit.ac.jp (Tsukamoto Chiaki)
34542011/07/06Re: ζ(1-r,x)=-rB_r(x) (where x∈C)とζ_{amodN}(1-r)=-1/r N^{r-1}B_r(a/N)を示せchiaki@kit.ac.jp (Tsukamoto Chiaki)
34532011/07/04Re: ζ(s),DL(s,χ),_{amodN(s)},ζ(s,x)の複素平面上での正則性・有理型性・解析接続可能性の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34522011/07/04Re: Bernoulli数,∀n∈Nに対してB_{2n+1}=0となる事の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34512011/07/03Re: Σ_{n=1}^∞f_n(z)に於いて,f_n(z)が正則関数且つ広義一様収束すればΣ_{n=1}^∞f_n(z)も正則関数chiaki@kit.ac.jp (Tsukamoto Chiaki)
34502011/07/02Re: L(r,χ)=1/(r-1)!・(-2πi/N)^r・1/2Σ_{a∈Z_N^×}χ(a)h_r(ζ_N^a)の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34492011/07/01Re: ζ(1-r,x)=-rB_r(x) (where x∈C)とζ_{amodN}(1-r)=-1/r N^{r-1}B_r(a/N)を示せchiaki@kit.ac.jp (Tsukamoto Chiaki)
34482011/06/30Re: L(r,χ)=1/(r-1)!・(-2πi/N)^r・1/2Σ_{a∈Z_N^×}χ(a)h_r(ζ_N^a)の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34472011/06/29Re: ζ(s),DL(s,χ),_{amodN(s)},ζ(s,x)の複素平面上での正則性・有理型性・解析接続可能性の証明KyokoYoshida <kyokoyoshida123@gmail.com>
34462011/06/27Re: Bernoulli数,∀n∈Nに対してB_{2n+1}=0となる事の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34452011/06/27Re: ζ(s),DL(s,χ),_{amodN(s)},ζ(s,x)の複素平面上での正則性・有理型性・解析接続可能性の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34442011/06/27Re: Bernoulli $B?t (B, $B"O (Bn $B": (BN $B$KBP$7$F (BB_{2n+1}=0 $B$H$J$k;v$N>ZL@ (BKyokoYoshida <kyokoyoshida123@gmail.com>
34432011/06/27Re: Bernoulli $BB?9`<0 (B,B_n(0)=B_n $B$N>ZL@ (BKyokoYoshida <kyokoyoshida123@gmail.com>
34422011/06/27Re: L(s, $B&V (B)= $B&2 (B_{a=1}^N $B&V (B(a) $B&F (B_{amodN}(s) ( $BC"$7 (B, $B&V": (BDC(N),s $B": (BC) $B$r<($; (BKyokoYoshida <kyokoyoshida123@gmail.com>
34412011/06/27Re: $B&F (B(s),DL(s, $B&V (B),_{amodN(s)}, $B&F (B(s,x) $B$NJ#AGJ?LL>e$G$N@5B'@-!&M-M}7?@-!&2r@O@\B32DG=@-$N>ZL@ (BKyokoYoshida <kyokoyoshida123@gmail.com>
34402011/06/26Re: $B&F (B(s),DL(s, $B&V (B),_{amodN(s)}, $B&F (B(s,x) $B$NJ#AGJ?LL>e$G$N@5B'@-!&M-M}7?@-!&2r@O@\B32DG=@-$N>ZL@ (BKyokoYoshida <kyokoyoshida123@gmail.com>
34392011/06/23Re: Dirichlet指標の群での定義について
↑ リクエストされた記事
chiaki@kit.ac.jp (Tsukamoto Chiaki)
34382011/06/23Re: ζ(1-r,x)=-rB_r(x) (where x∈C)とζ_{amodN}(1-r)=-1/r N^{r-1}B_r(a/N)を示せchiaki@kit.ac.jp (Tsukamoto Chiaki)
34372011/06/23Re: Bernoulli数,∀n∈Nに対してB_{2n+1}=0となる事の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34362011/06/23Re: Bernoulli多項式,B_n(0)=B_nの証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34352011/06/23Re: Dirichlet $B;XI8$N72$G$NDj5A$K$D$$$F (BKyokoYoshida <kyokoyoshida123@gmail.com>
34342011/06/23Re: Dirichlet $B;XI8$N72$G$NDj5A$K$D$$$F (BKyokoYoshida <kyokoyoshida123@gmail.com>
34332011/06/23Re: $B&F (B(1-r,x)=-rB_r(x) (where x $B": (BC) $B$H&F (B_{amodN}(1-r)=-1/r N^{r-1}B_r(a/N) $B$r<($; (BKyokoYoshida <kyokoyoshida123@gmail.com>
34322011/06/23Re: Bernoulli $B?t (B, $B"O (Bn $B": (BN $B$KBP$7$F (BB_{2n+1}=0 $B$H$J$k;v$N>ZL@ (BKyokoYoshida <kyokoyoshida123@gmail.com>
34312011/06/23Re: Bernoulli $B?t (B, $B"O (Bn $B": (BN $B$KBP$7$F (BB_{2n+1}=0 $B$H$J$k;v$N>ZL@ (BKyokoYoshida <kyokoyoshida123@gmail.com>
34302011/06/23Re: Bernoulli $BB?9`<0 (B,B_n(0)=B_n $B$N>ZL@ (BKyokoYoshida <kyokoyoshida123@gmail.com>
34292011/06/22Re: ζ(s),DL(s,χ),_{amodN(s)},ζ(s,x)の複素平面上での正則性・有理型性・解析接続可能性の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34282011/06/22Re: L(s, $B&V (B) $B$NJ#AGJ?LLA4BN$X$NDj5A$N3HD%$K$D$$$F (BKyokoYoshida <kyokoyoshida123@gmail.com>
34272011/06/22Re: $B&F (B(s),DL(s, $B&V (B),_{amodN(s)}, $B&F (B(s,x) $B$NJ#AGJ?LL>e$G$N@5B'@-!&M-M}7?@-!&2r@O@\B32DG=@-$N>ZL@ (BKyokoYoshida <kyokoyoshida123@gmail.com>
34262011/06/21Re: L(s,χ)の複素平面全体への定義の拡張についてchiaki@kit.ac.jp (Tsukamoto Chiaki)
34252011/06/21Re: L(s,χ)=Σ_{a=1}^N χ(a)ζ_{amodN}(s) (但し,χ∈DC(N),s∈C)を示せchiaki@kit.ac.jp (Tsukamoto Chiaki)
34242011/06/21Re: Dirichlet指標の群での定義についてchiaki@kit.ac.jp (Tsukamoto Chiaki)
34232011/06/21Re: L(s, $B&V (B) $B$NJ#AGJ?LLA4BN$X$NDj5A$N3HD%$K$D$$$F (BKyokoYoshida <kyokoyoshida123@gmail.com>
34222011/06/21Re: L(s, $B&V (B)= $B&2 (B_{a=1}^N $B&V (B(a) $B&F (B_{amodN}(s) ( $BC"$7 (B, $B&V": (BDC(N),s $B": (BC) $B$r<($; (BKyokoYoshida <kyokoyoshida123@gmail.com>
34212011/06/21Dirichlet指標の群での定義についてKyokoYoshida <kyokoyoshida123@gmail.com>
34202011/06/20Re: L(s,χ)の複素平面全体への定義の拡張についてchiaki@kit.ac.jp (Tsukamoto Chiaki)
34192011/06/20Re: L(s,χ)=Σ_{a=1}^N χ(a)ζ_{amodN}(s) (但し,χ∈DC(N),s∈C)を示せchiaki@kit.ac.jp (Tsukamoto Chiaki)
34182011/06/20Re: ζ(1-r,x)=-rB_r(x) (where x∈C)とζ_{amodN}(1-r)=-1/r N^{r-1}B_r(a/N)を示せchiaki@kit.ac.jp (Tsukamoto Chiaki)
34172011/06/20Re: Bernoulli多項式,B_n(0)=B_nの証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34162011/06/20Re: Bernoulli数,∀n∈Nに対してB_{2n+1}=0となる事の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)
34152011/06/20Re: ζ(s),DL(s,χ),_{amodN(s)},ζ(s,x)の複素平面上での正則性・有理型性・解析接続可能性の証明chiaki@kit.ac.jp (Tsukamoto Chiaki)

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