| 2373 | 2008/12/10 | P_Aを最小多項式とし,P_A(t)=Π[i=1..r](t-α_i)^m_iでα_1,α_2,…,α_rが相異なるならP_(f(A))は次数1の因数で表される事を示せ | kyokoyoshida123@gmail.com |
| 2372 | 2008/12/10 | Re: f:V(+)V( $B!_ (B)V* $B"* (BF $B$r (Bf((v+v')( $B!_ (B)g)=g(v)+g(v') $B$GDj5A$9$k (B.f $B$,@~7A<LA|$G$"$k;v$r<($; (B | kyokoyoshida123@gmail.com |
| 2371 | 2008/12/09 | Re: E_ji $B$,8GM-%Y%/%H%k$G$"$k;v$r<($;!# (B | kyokoyoshida123@gmail.com |
| 2370 | 2008/12/08 | Re: f:V(+)V(×)V*→Fをf((v+v')(×)g)=g(v)+g(v')で定義する.fが線形写像である事を示せ | chiaki@kit.ac.jp (Tsukamoto Chiaki) |
| 2369 | 2008/12/08 | Re: f:V(+)V( $B!_ (B)V* $B"* (BF $B$r (Bf((v+v')( $B!_ (B)g)=g(v)+g(v') $B$GDj5A$9$k (B.f $B$,@~7A<LA|$G$"$k;v$r<($; (B | kyokoyoshida123@gmail.com |
| 2368 | 2008/12/08 | A unique way to learn English & Foreign Language | yuj99 <yuj1010@gmail.com> |
| 2367 | 2008/12/08 | Re: f:V(+)V(×)V*→Fをf((v+v')(×)g)=g(v)+g(v')で定義する.fが線形写像である事を示せ | chiaki@kit.ac.jp (Tsukamoto Chiaki) |
| 2366 | 2008/12/08 | Re: E_jiが固有ベクトルである事を示せ。 | chiaki@kit.ac.jp (Tsukamoto Chiaki) |
| 2365 | 2008/12/07 | f:V(+)V(×)V*→Fをf((v+v')(×)g)=g(v)+g(v')で定義する.fが線形写像である事を示せ | kyokoyoshida123@gmail.com |
| 2364 | 2008/12/07 | Re: E_ji $B$,8GM-%Y%/%H%k$G$"$k;v$r<($;!# (B | kyokoyoshida123@gmail.com |
| 2363 | 2008/12/06 | Re: ( $B&8 (B, $B&2 (B, $B&L (B) $B$K$*$$$F (Bf_k $B$O (Bf $B$K (BL^p $B<}B+ (B(1 $B!e (Bp $B!e!g (B) $B$J$i"O (Bg $B": (BL^q (1/p+1/q=1) $B$KBP$7$F"i (B_ $B&8 (Bf_k(x)g(x)d $B&L"*"i (B_ $B&8 (Bf(x)g(x)d $B&L$r<($; (B | kyokoyoshida123@gmail.com |
| 2362 | 2008/12/05 | Re: E_jiが固有ベクトルである事を示せ。 | chiaki@kit.ac.jp (Tsukamoto Chiaki) |
| 2361 | 2008/12/05 | E_jiが固有ベクトルである事を示せ。 | kyokoyoshida123@gmail.com |
| 2360 | 2008/12/05 | Re: (Ω,Σ,μ)においてf_kはfにL^p収束(1≦p≦∞)なら∀g∈L^q (1/p+1/q=1)に対して∫_Ωf_k(x)g(x)dμ→∫_Ωf(x)g(x)dμを示せ | chiaki@kit.ac.jp (Tsukamoto Chiaki) |
| 2359 | 2008/12/05 | Re: ( $B&8 (B, $B&2 (B, $B&L (B) $B$,&RM-8BB,EY6u4V$G (B1 $B!e (Bp< $B!g$G (Bf_k $B$O (Bf $B$K (BL^p $B<}B+$G"O (Bx $B":&8 (B,lim[k $B"*!g (B]g_k(x)=g(x) $B$G"O (Bk, $B!B (Bg_k $B!B (B_ $B!g!e (BM $B$J$i (Bf_kg_k $B$O (Bfg $B$K (BL^p $B<}B+$9$k;v$r<($; (B | kyokoyoshida123@gmail.com |
| 2358 | 2008/12/05 | Re: ( $B&8 (B, $B&2 (B, $B&L (B) $B$K$*$$$F (Bf_k $B$O (Bf $B$K (BL^p $B<}B+ (B(1 $B!e (Bp $B!e!g (B) $B$J$i"O (Bg $B": (BL^q (1/p+1/q=1) $B$KBP$7$F"i (B_ $B&8 (Bf_k(x)g(x)d $B&L"*"i (B_ $B&8 (Bf(x)g(x)d $B&L$r<($; (B | kyokoyoshida123@gmail.com |
| 2357 | 2008/12/05 | Re: (Ω,Σ,μ)においてf_kはfにL^p収束(1≦p≦∞)なら∀g∈L^q (1/p+1/q=1)に対して∫_Ωf_k(x)g(x)dμ→∫_Ωf(x)g(x)dμを示せ | chiaki@kit.ac.jp (Tsukamoto Chiaki) |
| 2356 | 2008/12/04 | Re: ( $B&8 (B, $B&2 (B, $B&L (B) $B$K$*$$$F (Bf_k $B$O (Bf $B$K (BL^p $B<}B+ (B(1 $B!e (Bp $B!e!g (B) $B$J$i"O (Bg $B": (BL^q (1/p+1/q=1) $B$KBP$7$F"i (B_ $B&8 (Bf_k(x)g(x)d $B&L"*"i (B_ $B&8 (Bf(x)g(x)d $B&L$r<($; (B | kyokoyoshida123@gmail.com |
| 2355 | 2008/12/03 | Re: (Ω,Σ,μ)がσ有限測度空間で1≦p<∞でf_kはfにL^p収束で∀x∈Ω,lim[k→∞]g_k(x)=g(x)で∀k,‖g_k‖_∞≦Mならf_kg_kはfgにL^p収束する事を示せ | chiaki@kit.ac.jp (Tsukamoto Chiaki) |