short map

In mathematics, a short map, or nonexpansive map, is a special kind of continuous function between metric spaces. Specifically, suppose that X and Y are metric spaces and f is a function from X to Y. Then we have a short map when, for any points x and y in X,

d_{Y}(f(x),f(y)) \leq d_{X}(x,y) . \!

Here d_X and d_Y denote the metrics on X and Y, respectively. The function f is short if and only if it is 1-Lipschitz continuous. f is an isometry if and only if it is short, it is a bijection, and its inverse is also short. (Because of the inverse function the inequality must become an equality.) The composite of short maps is also short. Thus metric spaces and short maps form a category Met; Met is a subcategory of the category of metric spaces and Lipschitz maps, and the isomorphisms in Met are the isometries. One can say that f is strictly short if the inequality is always strict. Then a contraction mapping is strictly short, but not necessarily the other way around. Note that an isometry is never strictly short (except in the degenerate case of the empty space).

<< Previous

Word Browser

Next >>

earl of strafford
international society for human rights
earl of cottenham
bpm 37093
dp combo
mirabal sisters
earl cowley
national water carrier
destiny
ivan ranger
earl of dudley

hms rodney
bonnie wright
earl of cromartie
chris rankin
earl cairns
castration cult
marquis de custine
at&t corporate center
earl of lytton
narodniy artist
new york mercantile exchange

aisin gioro
corporate logo
tunnels in iceland
tropaeolaceae
tailings
reserved political positions
caudron c.714
uss lawrence
uss barney
superstar
ronald melzack

strongbow cider
diego marani
joint premiers of the province of canada
byssus
free body
to tell the truth
hidden surface determination
land rehabilitation
spooling
theology of anabaptism
treasury stock