Applications/examples of these properties?











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Here are two interesting properties on series :



The first one :




Let $(u_n)in(mathbb{R^+})^{mathbb{N}}$ such that $sum limits_{nge 0} u_n=+infty$. Then there exists $(v_n)in(mathbb{R^+})^{mathbb{N}}$ such that $sum limits_{nge 0} v_n=+infty$ with $v_n underset{nto +infty}{=} o(u_n)$.




Then the second one :




If $(g_k)_{kin mathbb{N}^*}$ is a strictly increasing sequence of strictly positive integers such that there exists $nu >0$ with for all $kin mathbb{N}^*$, $(g_{k+1}-g_k)le nu (g_k-g_{k-1})$ and if $(a_n)in (mathbb{R^+})^{mathbb{N}}$ is strictly decreasing then $sum limits_{nge 1}a_n<+infty$ iff $sum limits_{kge 1}(g_{k+1}-g_k)a_{g_k}<+infty$.




Could we find applications or examples of these two properties ?



Thanks in advance !










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    up vote
    0
    down vote

    favorite












    Here are two interesting properties on series :



    The first one :




    Let $(u_n)in(mathbb{R^+})^{mathbb{N}}$ such that $sum limits_{nge 0} u_n=+infty$. Then there exists $(v_n)in(mathbb{R^+})^{mathbb{N}}$ such that $sum limits_{nge 0} v_n=+infty$ with $v_n underset{nto +infty}{=} o(u_n)$.




    Then the second one :




    If $(g_k)_{kin mathbb{N}^*}$ is a strictly increasing sequence of strictly positive integers such that there exists $nu >0$ with for all $kin mathbb{N}^*$, $(g_{k+1}-g_k)le nu (g_k-g_{k-1})$ and if $(a_n)in (mathbb{R^+})^{mathbb{N}}$ is strictly decreasing then $sum limits_{nge 1}a_n<+infty$ iff $sum limits_{kge 1}(g_{k+1}-g_k)a_{g_k}<+infty$.




    Could we find applications or examples of these two properties ?



    Thanks in advance !










    share|cite|improve this question


























      up vote
      0
      down vote

      favorite









      up vote
      0
      down vote

      favorite











      Here are two interesting properties on series :



      The first one :




      Let $(u_n)in(mathbb{R^+})^{mathbb{N}}$ such that $sum limits_{nge 0} u_n=+infty$. Then there exists $(v_n)in(mathbb{R^+})^{mathbb{N}}$ such that $sum limits_{nge 0} v_n=+infty$ with $v_n underset{nto +infty}{=} o(u_n)$.




      Then the second one :




      If $(g_k)_{kin mathbb{N}^*}$ is a strictly increasing sequence of strictly positive integers such that there exists $nu >0$ with for all $kin mathbb{N}^*$, $(g_{k+1}-g_k)le nu (g_k-g_{k-1})$ and if $(a_n)in (mathbb{R^+})^{mathbb{N}}$ is strictly decreasing then $sum limits_{nge 1}a_n<+infty$ iff $sum limits_{kge 1}(g_{k+1}-g_k)a_{g_k}<+infty$.




      Could we find applications or examples of these two properties ?



      Thanks in advance !










      share|cite|improve this question















      Here are two interesting properties on series :



      The first one :




      Let $(u_n)in(mathbb{R^+})^{mathbb{N}}$ such that $sum limits_{nge 0} u_n=+infty$. Then there exists $(v_n)in(mathbb{R^+})^{mathbb{N}}$ such that $sum limits_{nge 0} v_n=+infty$ with $v_n underset{nto +infty}{=} o(u_n)$.




      Then the second one :




      If $(g_k)_{kin mathbb{N}^*}$ is a strictly increasing sequence of strictly positive integers such that there exists $nu >0$ with for all $kin mathbb{N}^*$, $(g_{k+1}-g_k)le nu (g_k-g_{k-1})$ and if $(a_n)in (mathbb{R^+})^{mathbb{N}}$ is strictly decreasing then $sum limits_{nge 1}a_n<+infty$ iff $sum limits_{kge 1}(g_{k+1}-g_k)a_{g_k}<+infty$.




      Could we find applications or examples of these two properties ?



      Thanks in advance !







      sequences-and-series limits divergent-series






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      share|cite|improve this question













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      edited Nov 29 at 20:35

























      asked Nov 28 at 0:50









      Maman

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      1,134722



























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