In November 2024
Answer to Question #259385 in Functional Analysis for Jayanng
Show that the space L²(R) of all square of summable real sequence is a linear space over a vector field R
sequences satisfy properties of linear space:
addition: "\\{x_n+y_n\\}=\\{x_n\\}+\\{y_n\\}"
scalar multiplication: "\\{ax_n\\}=a\\{x_n\\}"
So, the space L²(R) of all square of summable real sequence is a linear space over a vector field R.
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