- Partition of unity
In
mathematics , a partition of unity of atopological space "X" is a set of continuous functions, , from "X" to theunit interval [0,1] such that for every point, ,
* there is a neighbourhood of "x" where all but a finite number of the functions areidentically zero , and
* the sum of all the respective function values at "x" (for every "x" in "X") is identically 1, i.e., . Note however, that this requirement can be weakened to the requirement that the sum of all the respective function values at "x" (for every "x" in "X") is "n" for any non-zero real number "n"
* sometimes, the requirement not as strict: the sum of all the function values at a particular point is only required to be positive rather than a fixed number for all points in the spacePartitions of unity are useful because they often allow one to extend local constructions to the whole space.
The existence of partitions of unity assumes two distinct forms:
# Given any open cover {"U""i"}"i"∈"I" of a space, there exists a partition {ρ"i"}"i"∈"I" indexed "over the same set I" such that supp ρ"i"⊆"U""i". Such a partition is said to be subordinate to the open cover {"U""i"}"i".
# Given any open cover {"U""i"}"i"∈"I" of a space, there exists a partition {ρ"j"}"j"∈"J" indexed over a possibly distinct index set "J" such that each ρ"j" has compact support and for each "j"∈"J", supp ρ"j"⊆"U""i" for some "i"∈"I".Thus one chooses either to have the supports indexed by the open cover, or the supports compact. If the space is compact, then there exist partitions satisfying both requirements.
Paracompactness of the space is a necessary condition to guarantee the existence of a partition of unity. Depending on the category which the space belongs to, it may also be a sufficient condition. The construction uses
mollifier s (bump functions), which exist in the continuous and smooth categories, but not the analytic category. Thus analytic partitions of unity do not exist.ee also
*
paracompact space
*gluing axiom
*fine sheaf
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