Sublinear function linear algebra , a sublinear function is a function on a vector space X over an ordered field ? , that satisfies the following properties:Positive homogeneity : for any positive and any ; andSubadditivity : for all.functional analysis the name Banach functional is used for sublinear functions, especially when formulating Hahn–Banach theorem .computer science , a function is called sublinear if, or f ∈ o in asymptotic notation . f ∈ o if and only if , for any given c > 0, there exists an N such that f < cn for n ≥ N .f grows slower than any linear function .convex , almost the opposite is true for functions of sublinear growth: every function f ∈ o can be upper-bounded by a concave function of sublinear growth .Definitions A sublinear functional f is called positive if f ≥ 0 for all x ∈ X . X , denoted by X # , by declaring p ≤ q if and only if p ≤ q for all x ∈ X . minimal if it is a minimal element of X # under this order. linear functional .Examples and sufficient conditions Every seminorm and norm is a sublinear function. The converse is not true, because norms can have their domain vector space over any field and must have as their codomain. Every linear functional a sublinear function. The converse is not true in general. If and are sublinear functions on a real vector space then so is the map. More generally, if is any non-empty collection of sublinear functionals on a real vector space and if for all,, then is a sublinear functional on. The linear functional on is a sublinear functional that is not positive and is not a seminorm. Properties If is a real-valued sublinear functional on then:Associated seminorm If is a real-valued sublinear functional on then the map defines a seminorm on called the seminorm associated with .If is a sublinear functional on a real vector space then the following are equivalent: is a linear functional; for every , ;for every, ; is a minimal sublinear functional. exists a linear functional on such that. Continuity Suppose is a TVS over the real or complex numbers and is a sublinear functional on. is continuous ; is continuous at 0; is uniformly continuous on ; is open in. Relation to open convex sets Suppose that is a TVS over the real or complex numbers. Operators The concept can be extended to operators that are homogeneous and subadditive. ordered vector space to make sense of the conditions.
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