Zero norm[edit]
In probability and functional analysis, the zero norm induces a complete metric topology for the space of measurable functions and for the F-space of sequences with F–norm [11] Here we mean by F-normsome real-valued function on an F-space with distance d, such that The F-norm described above is not a norm in the usual sense because it lacks the required homogeneity property.
https://en.wikipedia.org/wiki/Norm_(mathematics)#Zero_norm
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