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A '''weight function''' is a mathematical device used when performing a sum, integral, or average to give some elements more "weight" or influence on the result than other elements in the same set. They occur frequently in [[statistics]] and [[mathematical analysis|analysis]], and are closely related to the concept of a [[measure (mathematics)|measure]]Weight functions can be employed in both discrete and continuous settings. They can be used to construct systems of calculus called "weighted calculus"<ref>Jane Grossman, Michael Grossman, Robert Katz. [http://books.google.com/books?as_brr=0&q=%22The+First+Systems+of+Weighted+Differential+and+Integral+Calculus%E2%80%8E%22&btnG=Search+Books,''The First Systems of Weighted Differential and Integral Calculus''], ISBN 0-9771170-1-4, 1980.</ref> and "meta-calculus".<ref>Jane Grossman.[http://books.google.com/books?q=%22Non-Newtonian+Calculus%22&btnG=Search+Books&as_brr=0, ''Meta-Calculus: Differential and Integral''], ISBN 0-9771170-2-2, 1981.</ref>
 
== Discrete weights ==
=== General definition ===
In the discrete setting, a weight function <math>\scriptstyle w\colon A \to {\Bbb R}^+</math> is a positive function defined on a [[discrete mathematics|discrete]] [[Set (mathematics)|set]] '''<math>A</math>''', which is typically
[[finite set|finite]] or [[countable]]. The weight function <math>w(a) := 1</math> corresponds to the ''unweighted'' situation in which all elements have equal weight.  One can then apply this weight to various concepts.
 
If the function <math>\scriptstyle f\colon A \to {\Bbb R}</math> is a [[real number|real]]-valued [[mathematical function|function]], then the ''unweighted [[sum]] of <math>f</math> on '''<math>A</math>''''' is defined as
 
:<math>\sum_{a \in A} f(a);</math>
 
but given a ''weight function'' <math>\scriptstyle w\colon A \to {\Bbb R}^+</math>, the '''weighted sum''' or [[conical combination]] is defined as
 
:<math>\sum_{a \in A} f(a) w(a).</math>
 
One common application of weighted sums arises in [[numerical integration]].
 
If ''B'' is a [[finite set|finite]] subset of ''A'', one can replace the unweighted [[cardinality]] ''|B|'' of ''B'' by the ''weighted cardinality''
 
:<math>\sum_{a \in B} w(a).</math>
 
If ''A'' is a [[finite set|finite]] non-empty set, one can replace the unweighted [[mean]] or [[average]]
 
:<math>\frac{1}{|A|} \sum_{a \in A} f(a)</math>
 
by the [[weighted mean]] or [[weighted average]]
 
:<math> \frac{\sum_{a \in A} f(a) w(a)}{\sum_{a \in A} w(a)}.</math>
 
In this case only the ''relative'' weights are relevant.
 
=== Statistics ===
Weighted means are commonly used in [[statistics]] to compensate for the presence of [[bias]]. For a quantity  <math>f</math> measured multiple independent times <math>f_i</math> with [[variance]] <math>\scriptstyle\sigma^2_i</math>, the best estimate of the signal is obtained
by averaging all the measurements with weight <math>\scriptstyle w_i=\frac 1 {\sigma_i^2}</math>, and
the resulting variance is smaller than each of the independent measurements
<math>\scriptstyle\sigma^2=1/\sum w_i</math>. The [[Maximum likelihood]] method weights the difference between fit and data using the same weights <math>w_i</math>.
 
=== Mechanics ===
The terminology ''weight function'' arises from [[mechanics]]: if one has a collection of ''<math>n</math>'' objects on a [[lever]], with weights <math>\scriptstyle w_1, \dotsc, w_n</math> (where [[weight]] is now interpreted in the physical sense) and locations :<math>\scriptstyle\boldsymbol{x}_1,\dotsc,\boldsymbol{x}_n</math>, then the lever will be in balance if the [[Lever|fulcrum]] of the lever is at the [[center of mass]]
 
:<math>\frac{\sum_{i=1}^n w_i \boldsymbol{x}_i}{\sum_{i=1}^n w_i},</math>
 
which is also the weighted average of the positions <math>\scriptstyle\boldsymbol{x}_i</math>.
 
== Continuous weights ==
In the continuous setting, a weight is a positive [[measure (mathematics)|measure]] such as ''<math>w(x) dx</math>'' on some [[domain (mathematics)|domain]] '''<math>\Omega</math>''',which is typically a [[subset]] of a [[Euclidean space]] <math>\scriptstyle{\Bbb R}^n</math>, for instance '''<math>\Omega</math>''' could be an [[Interval (mathematics)|interval]] <math>[a,b]</math>. Here ''<math>dx</math>'' is [[Lebesgue measure]] and <math>\scriptstyle w\colon \Omega \to \R^+</math> is a non-negative [[measurable]] [[mathematical function|function]].  In this context, the weight function ''<math>w(x)</math>'' is sometimes referred to as a [[density]].
 
=== General definition ===
If <math>f\colon \Omega \to {\Bbb R}</math> is a [[real number|real]]-valued [[mathematical function|function]], then the ''unweighted'' [[integral]]
 
:<math>\int_\Omega f(x)\ dx</math>
 
can be generalized to the ''weighted integral''
 
:<math>\int_\Omega f(x) w(x)\, dx</math>
 
Note that one may need to require ''<math>f</math>'' to be [[absolutely integrable]] with respect to the weight ''<math>w(x) dx</math>'' in order for this integral to be finite.
 
=== Weighted volume ===
If ''E'' is a subset of <math>\Omega</math>, then the [[volume]] vol(''E'') of ''E'' can be generalized to the ''weighted volume''
:<math> \int_E w(x)\ dx,</math>
 
=== Weighted average ===
If <math>\Omega</math> has finite non-zero weighted volume, then we can replace the unweighted [[average]]
 
:<math>\frac{1}{\mathrm{vol}(\Omega)} \int_\Omega f(x)\ dx</math>
 
by the '''weighted average'''
 
:<math> \frac{\int_\Omega f(x)\ w(x) dx}{\int_\Omega w(x)\ dx}</math>
 
=== Inner product ===
If <math>\scriptstyle f\colon \Omega \to {\Bbb R}</math> and <math>\scriptstyle g\colon \Omega \to {\Bbb R}</math> are two functions, one can generalize the unweighted [[inner product]]
 
:<math>\langle f, g \rangle := \int_\Omega f(x) g(x)\ dx</math>
 
to a weighted inner product
 
:<math>\langle f, g \rangle := \int_\Omega f(x) g(x)\ w(x)\ dx.</math>
 
See the entry on [[Orthogonality]] for more details.
 
== See also ==
* [[Center of mass]]
* [[Numerical integration]]
* [[Orthogonality]]
* [[Weighted mean]]
* [[Kernel (statistics)]]
 
==References==
{{Reflist}}
 
{{DEFAULTSORT:Weight Function}}
[[Category:Mathematical analysis]]
[[Category:Measure theory]]
[[Category:Combinatorial optimization]]
[[Category:Functional analysis]]
[[Category:Types of functions]]

Revision as of 16:33, 4 January 2014

A weight function is a mathematical device used when performing a sum, integral, or average to give some elements more "weight" or influence on the result than other elements in the same set. They occur frequently in statistics and analysis, and are closely related to the concept of a measure. Weight functions can be employed in both discrete and continuous settings. They can be used to construct systems of calculus called "weighted calculus"[1] and "meta-calculus".[2]

Discrete weights

General definition

In the discrete setting, a weight function w:A+ is a positive function defined on a discrete set A, which is typically finite or countable. The weight function w(a):=1 corresponds to the unweighted situation in which all elements have equal weight. One can then apply this weight to various concepts.

If the function f:A is a real-valued function, then the unweighted sum of f on A is defined as

aAf(a);

but given a weight function w:A+, the weighted sum or conical combination is defined as

aAf(a)w(a).

One common application of weighted sums arises in numerical integration.

If B is a finite subset of A, one can replace the unweighted cardinality |B| of B by the weighted cardinality

aBw(a).

If A is a finite non-empty set, one can replace the unweighted mean or average

1|A|aAf(a)

by the weighted mean or weighted average

aAf(a)w(a)aAw(a).

In this case only the relative weights are relevant.

Statistics

Weighted means are commonly used in statistics to compensate for the presence of bias. For a quantity f measured multiple independent times fi with variance σi2, the best estimate of the signal is obtained by averaging all the measurements with weight wi=1σi2, and the resulting variance is smaller than each of the independent measurements σ2=1/wi. The Maximum likelihood method weights the difference between fit and data using the same weights wi.

Mechanics

The terminology weight function arises from mechanics: if one has a collection of n objects on a lever, with weights w1,,wn (where weight is now interpreted in the physical sense) and locations :x1,,xn, then the lever will be in balance if the fulcrum of the lever is at the center of mass

i=1nwixii=1nwi,

which is also the weighted average of the positions xi.

Continuous weights

In the continuous setting, a weight is a positive measure such as w(x)dx on some domain Ω,which is typically a subset of a Euclidean space n, for instance Ω could be an interval [a,b]. Here dx is Lebesgue measure and w:Ω+ is a non-negative measurable function. In this context, the weight function w(x) is sometimes referred to as a density.

General definition

If f:Ω is a real-valued function, then the unweighted integral

Ωf(x)dx

can be generalized to the weighted integral

Ωf(x)w(x)dx

Note that one may need to require f to be absolutely integrable with respect to the weight w(x)dx in order for this integral to be finite.

Weighted volume

If E is a subset of Ω, then the volume vol(E) of E can be generalized to the weighted volume

Ew(x)dx,

Weighted average

If Ω has finite non-zero weighted volume, then we can replace the unweighted average

1vol(Ω)Ωf(x)dx

by the weighted average

Ωf(x)w(x)dxΩw(x)dx

Inner product

If f:Ω and g:Ω are two functions, one can generalize the unweighted inner product

f,g:=Ωf(x)g(x)dx

to a weighted inner product

f,g:=Ωf(x)g(x)w(x)dx.

See the entry on Orthogonality for more details.

See also

References

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  1. Jane Grossman, Michael Grossman, Robert Katz. The First Systems of Weighted Differential and Integral Calculus, ISBN 0-9771170-1-4, 1980.
  2. Jane Grossman.Meta-Calculus: Differential and Integral, ISBN 0-9771170-2-2, 1981.