Series convergence in $L_2$












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Is it true that if $sum_{n=1}^{infty} s_n^2$ converges and $u_n in L_2[a;b]$ are bounded then the series $sum_{n=1}^{infty} s_n u_n$ converges to $L_2$ function?
If so, how can I prove it?










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    $begingroup$


    Is it true that if $sum_{n=1}^{infty} s_n^2$ converges and $u_n in L_2[a;b]$ are bounded then the series $sum_{n=1}^{infty} s_n u_n$ converges to $L_2$ function?
    If so, how can I prove it?










    share|cite|improve this question









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      0








      0





      $begingroup$


      Is it true that if $sum_{n=1}^{infty} s_n^2$ converges and $u_n in L_2[a;b]$ are bounded then the series $sum_{n=1}^{infty} s_n u_n$ converges to $L_2$ function?
      If so, how can I prove it?










      share|cite|improve this question









      $endgroup$




      Is it true that if $sum_{n=1}^{infty} s_n^2$ converges and $u_n in L_2[a;b]$ are bounded then the series $sum_{n=1}^{infty} s_n u_n$ converges to $L_2$ function?
      If so, how can I prove it?







      convergence lp-spaces






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      asked Dec 12 '18 at 19:16









      Anton ZagrivinAnton Zagrivin

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          $begingroup$

          It does hold, using Pythagores’ theorem and completeness, if the $u_n$ are pairwise orthogonal.



          It is false in general though, take for instance $s_n=n^{-1}$ and $u_n=1$.






          share|cite|improve this answer









          $endgroup$













          • $begingroup$
            Oh, my system ${u_n}$ is really pairwise orthogonal and I just forgot about this condition. Thanks a lot
            $endgroup$
            – Anton Zagrivin
            Dec 13 '18 at 20:06











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          1 Answer
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          0












          $begingroup$

          It does hold, using Pythagores’ theorem and completeness, if the $u_n$ are pairwise orthogonal.



          It is false in general though, take for instance $s_n=n^{-1}$ and $u_n=1$.






          share|cite|improve this answer









          $endgroup$













          • $begingroup$
            Oh, my system ${u_n}$ is really pairwise orthogonal and I just forgot about this condition. Thanks a lot
            $endgroup$
            – Anton Zagrivin
            Dec 13 '18 at 20:06
















          0












          $begingroup$

          It does hold, using Pythagores’ theorem and completeness, if the $u_n$ are pairwise orthogonal.



          It is false in general though, take for instance $s_n=n^{-1}$ and $u_n=1$.






          share|cite|improve this answer









          $endgroup$













          • $begingroup$
            Oh, my system ${u_n}$ is really pairwise orthogonal and I just forgot about this condition. Thanks a lot
            $endgroup$
            – Anton Zagrivin
            Dec 13 '18 at 20:06














          0












          0








          0





          $begingroup$

          It does hold, using Pythagores’ theorem and completeness, if the $u_n$ are pairwise orthogonal.



          It is false in general though, take for instance $s_n=n^{-1}$ and $u_n=1$.






          share|cite|improve this answer









          $endgroup$



          It does hold, using Pythagores’ theorem and completeness, if the $u_n$ are pairwise orthogonal.



          It is false in general though, take for instance $s_n=n^{-1}$ and $u_n=1$.







          share|cite|improve this answer












          share|cite|improve this answer



          share|cite|improve this answer










          answered Dec 12 '18 at 19:36









          MindlackMindlack

          3,62517




          3,62517












          • $begingroup$
            Oh, my system ${u_n}$ is really pairwise orthogonal and I just forgot about this condition. Thanks a lot
            $endgroup$
            – Anton Zagrivin
            Dec 13 '18 at 20:06


















          • $begingroup$
            Oh, my system ${u_n}$ is really pairwise orthogonal and I just forgot about this condition. Thanks a lot
            $endgroup$
            – Anton Zagrivin
            Dec 13 '18 at 20:06
















          $begingroup$
          Oh, my system ${u_n}$ is really pairwise orthogonal and I just forgot about this condition. Thanks a lot
          $endgroup$
          – Anton Zagrivin
          Dec 13 '18 at 20:06




          $begingroup$
          Oh, my system ${u_n}$ is really pairwise orthogonal and I just forgot about this condition. Thanks a lot
          $endgroup$
          – Anton Zagrivin
          Dec 13 '18 at 20:06


















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