Asymmetric norm mathematics , an asymmetric norm on a vector space is a generalization of the concept of a norm.Definition An asymmetric norm on a real vector space V is a function that has the following properties: Subadditivity , or the triangle inequality: p ≤ p + p for every two vectors v ,w ∈ V . Homogeneity : p = λp for every vector v ∈ X and every non-negative real number λ ≥ 0. Positive definiteness : p > 0 unless v = 0. norms differ from norms in that they need not satisfy the equality p = p .condition of positive definiteness is omitted, then p is an asymmetric seminorm . A weaker condition than positive definiteness is non-degeneracy : that for v ≠ 0, at least one of the two numbers p and p is not zero .Examples If is a convex set that contains the origin, then an asymmetric seminorm can be defined on by the formulasquare with vertices, then is the taxicab norm . Different convex sets yield different seminorms, and every asymmetric seminorm on can be obtained from some convex set, called its dual unit ball . Therefore, asymmetric seminorms are in one-to-one correspondence with convex sets that contain the origin. The seminorm is finite-dimensional real vector space and is a compact convex subset of the dual space that contains the origin, then is an asymmetric seminorm on.
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