摘 要: | 设X为Banach空间,设{x_n}_(n=1)~∞为X中的无穷序列(其中允许{x_n}_(n=1)~∞中只有有限项不为0),称之为l_p(X)—序列,如果(sum from n=1 to ∞‖x_n‖~p)~(1/p)<+∞。用l_p(X)表示所有l_p(X)—序列所成的线性空间。特别当p=+∞时修改为:(?)‖x_n‖<+∞。l_p(X)按范数:‖{x_p}_(n=1)~∞‖_p=(sum from n=1 to ∞‖x_n‖~p)~(1/p) (1≤p<+∞)和‖{x_n}_(n=1)~∞‖_∞=(?)‖x_n‖
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