Quasinorm

Inlinear algebra,functional analysisand related areas ofmathematics,aquasinormis similar to anormin that it satisfies the norm axioms, except that thetriangle inequalityis replaced by $${\displaystyle \|x+y\|\leq K(\|x\|+\|y\|)}$$ for some${\displaystyle K>1.}$

Aquasi-seminorm^[1]on a vector space${\displaystyle X}$is a real-valued map${\displaystyle p}$on${\displaystyle X}$that satisfies the following conditions:

1. Non-negativity:${\displaystyle p\geq 0;}$
2. Absolute homogeneity:${\displaystyle p(sx)=|s|p(x)}$for all${\displaystyle x\in X}$and all scalars${\displaystyle s;}$
3. there exists a real${\displaystyle k\geq 1}$such that${\displaystyle p(x+y)\leq k[p(x)+p(y)]}$for all${\displaystyle x,y\in X.}$
   • If${\displaystyle k=1}$then this inequality reduces to thetriangle inequality.It is in this sense that this condition generalizes the usual triangle inequality.

Aquasinorm^[1]is a quasi-seminorm that also satisfies:

4. Positive definite/Point-separating:if${\displaystyle x\in X}$satisfies${\displaystyle p(x)=0,}$then${\displaystyle x=0.}$

A pair${\displaystyle (X,p)}$consisting of avector space${\displaystyle X}$and an associated quasi-seminorm${\displaystyle p}$is called aquasi-seminormed vector space. If the quasi-seminorm is a quasinorm then it is also called aquasinormed vector space.

Multiplier

Theinfimumof all values of${\displaystyle k}$that satisfy condition (3) is called themultiplierof${\displaystyle p.}$ The multiplier itself will also satisfy condition (3) and so it is the unique smallest real number that satisfies this condition. The term${\displaystyle k}$-quasi-seminormis sometimes used to describe a quasi-seminorm whose multiplier is equal to${\displaystyle k.}$

Anorm(respectively, aseminorm) is just a quasinorm (respectively, a quasi-seminorm) whose multiplier is${\displaystyle 1.}$ Thus everyseminormis a quasi-seminorm and everynormis a quasinorm (and a quasi-seminorm).

If${\displaystyle p}$is a quasinorm on${\displaystyle X}$then${\displaystyle p}$induces a vector topology on${\displaystyle X}$whose neighborhood basis at the origin is given by the sets:^[2] $${\displaystyle \{x\in X:p(x)<1/n\}}$$ as${\displaystyle n}$ranges over the positive integers. Atopological vector spacewith such a topology is called aquasinormed topological vector spaceor just aquasinormed space.

Every quasinormed topological vector space ispseudometrizable.

Acompletequasinormed space is called aquasi-Banach space.EveryBanach spaceis a quasi-Banach space, although not conversely.

A quasinormed space${\displaystyle (A,\|\,\cdot \,\|)}$is called aquasinormed algebraif the vector space${\displaystyle A}$is analgebraand there is a constant${\displaystyle K>0}$such that $${\displaystyle \|xy\|\leq K\|x\|\cdot \|y\|}$$ for all${\displaystyle x,y\in A.}$

Acompletequasinormed algebra is called aquasi-Banach algebra.

Atopological vector space(TVS) is a quasinormed space if and only if it has a bounded neighborhood of the origin.^[2]

Since every norm is a quasinorm, everynormed spaceis also a quasinormed space.

${\displaystyle L^{p}}$spaces with${\displaystyle 0<p<1}$

The${\displaystyle L^{p}}$spacesfor${\displaystyle 0<p<1}$are quasinormed spaces (indeed, they are evenF-spaces) but they are not, in general,normable(meaning that there might not exist any norm that defines their topology). For${\displaystyle 0<p<1,}$theLebesgue space${\displaystyle L^{p}([0,1])}$is acompletemetrizable TVS(anF-space) that isnotlocally convex(in fact, its onlyconvexopen subsets are itself${\displaystyle L^{p}([0,1])}$and the empty set) and theonlycontinuous linear functionalon${\displaystyle L^{p}([0,1])}$is the constant${\displaystyle 0}$function (Rudin 1991,§1.47). In particular, theHahn-Banach theoremdoesnothold for${\displaystyle L^{p}([0,1])}$when${\displaystyle 0<p<1.}$

• Metrizable topological vector space– A topological vector space whose topology can be defined by a metric
• Norm (mathematics)– Length in a vector space
• Seminorm– nonnegative-real-valued function on a real or complex vector space that satisfies the triangle inequality and is absolutely homogenousPages displaying wikidata descriptions as a fallback
• Topological vector space– Vector space with a notion of nearness

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