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{{New Testament manuscript infobox
{{Probability distribution|
| form   =  Papyrus
  name      =Wrapped Normal|
| number = <math>\mathfrak{P}</math><sup>17</sup>
   type      =density|
| image  =
  pdf_image =[[File:WrappedNormalPDF.png|325px|Plot of the von Mises PMF]]<br /><small>The support is chosen to be [-π,π] with μ=0</small>|
| isize  =  
  cdf_image =[[File:WrappedNormalCDF.png|325px|Plot of the von Mises CMF]]<br /><small>The support is chosen to be [-π,π] with μ=0</small>|
| caption=
  parameters =<math>\mu</math> real<br><math>\sigma>0</math>|
| name   = [[Oxyrhynchus Papyri|P. Oxy.]] 1078
  support    =<math>\theta \in</math> any interval of length 2π|
| sign   =  
   pdf        =<math>\frac{1}{2\pi}\vartheta\left(\frac{\theta-\mu}{2\pi},\frac{i\sigma^2}{2\pi}\right)</math>|
| text   = [[Epistle to the Hebrews|Hebrews]] 9 †
   cdf        =|
| script = [[Greek language|Greek]]
   mean      =<math>\mu</math>|
| date   = 4th century
  median    =<math>\mu</math>|
| found  = [[Egypt]], Lord Crawford
   mode      =<math>\mu</math>|
| now at = [[Cambridge University]]
  variance  =<math>1-e^{-\sigma^2/2}</math> (circular)|
| cite   = [[Bernard Pyne Grenfell|B. P. Grenfell]] & [[Arthur Surridge Hunt|A. S. Hunt]], ''Oxyrhynchus Papyri'' VIII, (London 1911), pp. 11-13
  skewness   =|
| size   = 14.2 x 8.4 cm
  kurtosis   =|
| type   = [[Alexandrian text-type]]
   entropy    =(see text)|
| cat    = II
   mgf        =|
| hand   =  
   cf        =<math>e^{-\sigma^2n^2/2+in\mu}</math>|
| note   =  
}}
}}
In [[probability theory]] and [[directional statistics]], a '''wrapped normal distribution''' is a [[wrapped distribution|wrapped probability distribution]] that results from the "wrapping" of the [[normal distribution]] around the [[unit circle]]. It finds application in the theory of [[Brownian motion]] and is a solution to the [[Theta function#A solution to heat equation|heat equation]] for [[periodic boundary conditions]]. It is closely approximated by the [[von Mises distribution]], which, due to its mathematical simplicity and tractability, is the most commonly used distribution in directional statistics.


'''Papyrus 17''' (in the [[Biblical manuscript#Gregory-Aland|Gregory-Aland numbering]]), signed by <math>\mathfrak{P}</math><sup>17</sup>, is an early copy of the [[New Testament]] in [[Greek language|Greek]]. It is a [[papyrus]] [[manuscript]] of the [[Epistle to the Hebrews]], but only contains verses 9:12-19. The manuscript has been [[Paleography|paleographically]] assigned to the 4th century.<ref name = Aland/> However, according to Philip Comfort it is from the late 3rd century.<ref name = Comfort/>
==Definition==
The [[probability density function]] of the wrapped normal distribution is<ref name="Mardia99">{{cite book |title=Directional Statistics |last=Mardia |first=Kantilal |authorlink=Kantilal Mardia |author2=Jupp, Peter E.  |year=1999|publisher=Wiley |location= |isbn=978-0-471-95333-3 |url=http://www.amazon.com/Directional-Statistics-Kanti-V-Mardia/dp/0471953334/ref=sr_1_1?s=books&ie=UTF8&qid=1311003484&sr=1-1#reader_0471953334 |accessdate=2011-07-19}}</ref>


== Description ==
:<math>
f_{WN}(\theta;\mu,\sigma)=\frac{1}{\sigma \sqrt{2\pi}} \sum^{\infty}_{k=-\infty} \exp \left[\frac{-(\theta - \mu + 2\pi k)^2}{2 \sigma^2} \right]
</math>


The leaf is in fragmentary condition (originally 19 by 25 cm).<ref name = Comfort>Philip W. Comfort, ''The Text of the Earlies of New Testament Greek Manuscripts'' (2001), p. 101. </ref> The text fills in where [[Codex Vaticanus Graecus 1209|Codex Vaticanus]] is vacant (from Hebrews 9:14).<ref name = Comfort/>
where ''μ'' and ''σ'' are the mean and standard deviation of the unwrapped distribution, respectively. [[Wrapped distribution|Expressing]] the above density function in terms of the [[characteristic function (probability theory)|characteristic function]] of the normal distribution yields:<ref name="Mardia99"/>


The [[Nomina Sacra]] are used throughout. The scribe used marks for punctation between verses 12 and 13, and between 15 and 16.<ref name = Comfort/> It has no [[Iotacism|itacistic]] errors.
:<math>
f_{WN}(\theta;\mu,\sigma)=\frac{1}{2\pi}\sum_{n=-\infty}^\infty e^{-\sigma^2n^2/2+in(\theta-\mu)} =\frac{1}{2\pi}\vartheta\left(\frac{\theta-\mu}{2\pi},\frac{i\sigma^2}{2\pi}\right) ,
</math>


The Greek text of this codex is representative of the [[Alexandrian text-type]]. [[Kurt Aland|Aland]] placed it in [[Categories of New Testament manuscripts#Category II|Category II]].<ref name = Aland>{{Cite book
where <math>\vartheta(\theta,\tau)</math> is the [[Theta function|Jacobi theta function]], given by
|last=Aland
|first=Kurt
|authorlink=Kurt Aland
|coauthors=[[Barbara Aland]]; Erroll F. Rhodes (trans.)
|title=The Text of the New Testament: An Introduction to the Critical Editions and to the Theory and Practice of Modern Textual Criticism
|publisher=[[William B. Eerdmans Publishing Company]]
|year=1995
|location=Grand Rapids
|page=97
|url=http://books.google.pl/books?id=2pYDsAhUOxAC&pg=PA97&lpg=PA97&dq=#v=onepage&q&f=false
|isbn=978-0-8028-4098-1}}</ref>


It was discovered by Lord Crawford in Egypt.<ref>[[Frederic G. Kenyon]], "Handbook to the Textual Criticism of the New Testament", London<sup>2</sup>, 1912, p. 44.</ref> The text was edited in 1911 by [[Bernard Pyne Grenfell|Grenfell]] and [[Arthur Surridge Hunt|Hunt]].<ref>{{Cite book
:<math>
| last = B. P.
\vartheta(\theta,\tau)=\sum_{n=-\infty}^\infty (w^2)^n q^{n^2}
| first = Grenfell
\text{ where } w \equiv e^{i\pi \theta}</math> and <math>q \equiv e^{i\pi\tau} .</math>
| authorlink = Bernard Pyne Grenfell
| coauthors = [[Arthur Surridge Hunt|A. S. Hunt]]
| title = Oxyrhynchus Papyri VIII
| publisher =
| year = 1898
| location = London
| pages = 11–13
| url = http://www.archive.org/stream/oxyrhynchuspapyr08grenuoft#page/10/mode/2up
| doi =
| id =
| isbn = }} </ref>


Currently housed at the [[Cambridge University Library]] (Add. 5893) in [[Cambridge]].<ref name = Aland/><ref>{{Cite web|url=http://intf.uni-muenster.de/vmr/NTVMR/ListeHandschriften.php?ObjID=10017|title=Handschriftenliste|publisher=Institute for New Testament Textual Research|accessdate=23 August 2011|location=Münster}}</ref>
The wrapped normal distribution may also be expressed in terms of the [[Jacobi triple product]]:<ref name="W&W">{{cite book |title=A Course of Modern Analysis |last=Whittaker |first=E. T. |authorlink= |author2=Watson, G. N. |year=2009 |publisher=Book Jungle |location= |isbn=978-1-4385-2815-1 |page= |pages= |url= |accessdate=}}</ref>


== See also ==
:<math>f_{WN}(\theta;\mu,\sigma)=\frac{1}{2\pi}\prod_{n=1}^\infty (1-q^n)(1+q^{n-1/2}z)(1+q^{n-1/2}/z) .</math>
 
where <math>z=e^{i(\theta-\mu)}\,</math> and <math>q=e^{-\sigma^2}.</math>
 
== Moments ==
 
In terms of the circular variable <math>z=e^{i\theta}</math> the circular moments of the wrapped Normal distribution are the characteristic function of the Normal distribution evaluated at integer arguments:
 
:<math>\langle z^n\rangle=\int_\Gamma e^{in\theta}\,f_{WN}(\theta;\mu,\sigma)\,d\theta = e^{i n \mu-n^2\sigma^2/2}.</math>
 
where <math>\Gamma\,</math> is some interval of length <math>2\pi</math>. The first moment is then the average value of ''z'', also known as the mean resultant, or mean resultant vector:
 
:<math>
\langle z \rangle=e^{i\mu-\sigma^2/2}
</math>
 
The mean angle is
 
:<math>
\theta_\mu=\mathrm{Arg}\langle z \rangle = \mu
</math>
 
and the length of the mean resultant is
 
:<math>
R=|\langle z \rangle| = e^{-\sigma^2/2}
</math>
 
The circular standard deviation, which is a useful measure of dispersion for the wrapped Normal distribution and its close relative, the [[von Mises distribution]] is given by:
 
:<math>
s=\sqrt{\ln(1/R^2)} = \sigma
</math>
 
== Estimation of parameters ==
 
A series of ''N'' measurements ''z''<sub>''n''</sub>&nbsp;=&nbsp;''e''<sup>&nbsp;''i&theta;''<sub>''n''</sub></sup> drawn from a wrapped normal distribution may be used to estimate certain parameters of the distribution. The average of the series {{overbar|''z''}} is defined as
 
:<math>\overline{z}=\frac{1}{N}\sum_{n=1}^N z_n</math>
 
and its expectation value will be just the first moment:
 
:<math>\langle\overline{z}\rangle=e^{i\mu-\sigma^2/2}. \,</math>
 
In other words, {{overbar|''z''}} is an unbiased estimator of the first moment. If we assume that the mean ''&mu;'' lies in the interval <nowiki>[</nowiki>&minus;''&pi;'',&nbsp;''&pi;''<nowiki>)</nowiki>, then Arg&nbsp;{{overbar|''z''}} will be a (biased) estimator of the mean&nbsp;''&mu;''.
 
Viewing the ''z''<sub>''n''</sub> as a set of vectors in the complex plane, the {{overbar|''R''}}<sup>2</sup> statistic is the square of the length of the averaged vector:
 
:<math>\overline{R}^2=\overline{z}\,\overline{z^*}=\left(\frac{1}{N}\sum_{n=1}^N \cos\theta_n\right)^2+\left(\frac{1}{N}\sum_{n=1}^N \sin\theta_n\right)^2 \, </math>
 
and its expected value is:
 
:<math>\left\langle \overline{R}^2\right\rangle = \frac{1}{N}+\frac{N-1}{N}\,e^{-\sigma^2}\,</math>
 
In other words, the statistic
 
:<math>R_e^2=\frac{N}{N-1}\left(\overline{R}^2-\frac{1}{N}\right)</math>
 
will be an unbiased estimator of ''e''<sup>&minus;''&sigma;''<sup>2</sup></sup>, and ln(1/''R''<sub>''e''</sub><sup>2</sup>) will be a (biased) estimator of&nbsp;''&sigma;''<sup>2</sup>
 
== Entropy ==
 
The [[Entropy (information theory)|information entropy]] of the wrapped normal distribution is defined as:<ref name="Mardia99"/>
 
:<math>H = -\int_\Gamma f_{WN}(\theta;\mu,\sigma)\,\ln(f_{WN}(\theta;\mu,\sigma))\,d\theta</math>
 
where <math>\Gamma</math> is any interval of length <math>2\pi</math>. Defining <math>z=e^{i(\theta-\mu)}</math> and <math>q=e^{-\sigma^2}</math>, the [[Jacobi triple product]] representation for the wrapped normal is:
 
:<math>f_{WN}(\theta;\mu,\sigma) = \frac{\phi(q)}{2\pi}\prod_{m=1}^\infty (1+q^{m-1/2}z)(1+q^{m-1/2}z^{-1})</math>
 
where <math>\phi(q)\,</math> is the [[Euler function]]. The logarithm of the density of the wrapped normal distribution may be written:
 
:<math>\ln(f_{WN}(\theta;\mu,\sigma))=  \ln\left(\frac{\phi(q)}{2\pi}\right)+\sum_{m=1}^\infty\ln(1+q^{m-1/2}z)+\sum_{m=1}^\infty\ln(1+q^{m-1/2}z^{-1})</math>
 
Using the series expansion for the logarithm:
 
:<math>\ln(1+x)=-\sum_{k=1}^\infty \frac{(-1)^k}{k}\,x^k</math>
 
the logarithmic sums may be written as:
 
:<math>\sum_{m=1}^\infty\ln(1+q^{m-1/2}z^{\pm 1})=-\sum_{m=1}^\infty \sum_{k=1}^\infty \frac{(-1)^k}{k}\,q^{mk-k/2}z^{\pm k} = -\sum_{k=1}^\infty \frac{(-1)^k}{k}\,\frac{q^{k/2}}{1-q^k}\,z^{\pm k}</math>
 
so that the logarithm of density of the wrapped normal distribution may be written as:
 
:<math>\ln(f_{WN}(\theta;\mu,\sigma))=\ln\left(\frac{\phi(q)}{2\pi}\right)-\sum_{k=1}^\infty \frac{(-1)^k}{k} \frac{q^{k/2}}{1-q^k}\,(z^k+z^{-k}) </math>
 
which is essentially a [[Fourier series]] in <math>\theta\,</math>. Using the characteristic function representation for the wrapped normal distribution in the left side of the integral:
 
:<math>f_{WN}(\theta;\mu,\sigma) =\frac{1}{2\pi}\sum_{n=-\infty}^\infty q^{n^2/2}\,z^n</math>


* [[List of New Testament papyri]]
the entropy may be written:


== References ==
:<math>H = -\ln\left(\frac{\phi(q)}{2\pi}\right)+\frac{1}{2\pi}\int_\Gamma \left( \sum_{n=-\infty}^\infty\sum_{k=1}^\infty \frac{(-1)^k}{k} \frac{q^{(n^2+k)/2}}{1-q^k}\left(z^{n+k}+z^{n-k}\right) \right)\,d\theta</math>
{{Reflist}}


== Further reading ==
which may be integrated to yield:


* {{Cite book
:<math>H = -\ln\left(\frac{\phi(q)}{2\pi}\right)+2\sum_{k=1}^\infty \frac{(-1)^k}{k}\, \frac{q^{(k^2+k)/2}}{1-q^k}</math>
| last = B. P.
| first = Grenfell
| authorlink = Bernard Pyne Grenfell
| coauthors = [[Arthur Surridge Hunt|A. S. Hunt]]
| title = Oxyrhynchus Papyri VIII
| publisher =
| year = 1898
| location = London
| pages = 11–13
| url = http://www.archive.org/stream/oxyrhynchuspapyr08grenuoft#page/10/mode/2up
| doi =
| id =
| isbn = }}


== External links ==
== See also ==


* [http://163.1.169.40/cgi-bin/library?e=d-000-00---0POxy--00-0-0--0prompt-10---4----ded--0-1l--1-en-50---20-about-1708--00031-001-1-0utfZz-8-00&a=d&c=POxy&cl=CL5.1.8&d=HASH01cdb7e2244564938a037abc P.Oxy.LXIV 1078] from Papyrology at Oxford's "POxy: Oxyrhynchus Online"
* [[Wrapped distribution]]
* [[Dirac comb]]
* [[Wrapped Cauchy distribution]]
 
== References ==
{{More footnotes|date=June 2014}}
<references/>
* {{cite book |title=Statistics of Earth Science Data |last=Borradaile |first=Graham |year=2003 |publisher=Springer |isbn=978-3-540-43603-4 |url=http://books.google.com/books?id=R3GpDglVOSEC&printsec=frontcover&source=gbs_navlinks_s#v=onepage&q=&f=false |accessdate=31 Dec 2009}}
* {{cite book |title=Statistical Analysis of Circular Data |last=Fisher |first=N. I. |year=1996 |publisher=Cambridge University Press |location= |isbn=978-0-521-56890-6
|url=http://books.google.com/books?id=IIpeevaNH88C&dq=%22circular+variance%22+fisher&source=gbs_navlinks_s |accessdate=2010-02-09}}
* {{cite journal |last1=Breitenberger |first1=Ernst |year=1963 |title=Analogues of the normal distribution on the circle and the sphere |journal=Biometrika |volume=50 |pages=81 |url=http://biomet.oxfordjournals.org/cgi/pdf_extract/50/1-2/81 |doi=10.2307/2333749}}


{{Grenfell and Hunt}}
==External links==
* [http://www.codeproject.com/Articles/190833/Circular-Values-Math-and-Statistics-with-Cplusplus Circular Values Math and Statistics with C++11], A C++11 infrastructure for circular values (angles, time-of-day, etc.) mathematics and statistics


{{DEFAULTSORT:Papyrus 0017}}
{{ProbDistributions|directional}}
[[Category:New Testament papyri]]
[[Category:4th-century biblical manuscripts]]


[[de:Papyrus 17]]
[[Category:Continuous distributions]]
[[it:Papiro 17]]
[[Category:Directional statistics]]
[[nl:Papyrus 17]]
[[Category:Normal distribution]]
[[pl:Papirus 17]]
[[Category:Probability distributions]]
[[pt:Papiro 17]]

Revision as of 16:48, 17 August 2014

Template:Probability distribution In probability theory and directional statistics, a wrapped normal distribution is a wrapped probability distribution that results from the "wrapping" of the normal distribution around the unit circle. It finds application in the theory of Brownian motion and is a solution to the heat equation for periodic boundary conditions. It is closely approximated by the von Mises distribution, which, due to its mathematical simplicity and tractability, is the most commonly used distribution in directional statistics.

Definition

The probability density function of the wrapped normal distribution is[1]

fWN(θ;μ,σ)=1σ2πk=exp[(θμ+2πk)22σ2]

where μ and σ are the mean and standard deviation of the unwrapped distribution, respectively. Expressing the above density function in terms of the characteristic function of the normal distribution yields:[1]

fWN(θ;μ,σ)=12πn=eσ2n2/2+in(θμ)=12πϑ(θμ2π,iσ22π),

where ϑ(θ,τ) is the Jacobi theta function, given by

ϑ(θ,τ)=n=(w2)nqn2 where weiπθ and qeiπτ.

The wrapped normal distribution may also be expressed in terms of the Jacobi triple product:[2]

fWN(θ;μ,σ)=12πn=1(1qn)(1+qn1/2z)(1+qn1/2/z).

where z=ei(θμ) and q=eσ2.

Moments

In terms of the circular variable z=eiθ the circular moments of the wrapped Normal distribution are the characteristic function of the Normal distribution evaluated at integer arguments:

zn=ΓeinθfWN(θ;μ,σ)dθ=einμn2σ2/2.

where Γ is some interval of length 2π. The first moment is then the average value of z, also known as the mean resultant, or mean resultant vector:

z=eiμσ2/2

The mean angle is

θμ=Argz=μ

and the length of the mean resultant is

R=|z|=eσ2/2

The circular standard deviation, which is a useful measure of dispersion for the wrapped Normal distribution and its close relative, the von Mises distribution is given by:

s=ln(1/R2)=σ

Estimation of parameters

A series of N measurements zn = e n drawn from a wrapped normal distribution may be used to estimate certain parameters of the distribution. The average of the series Template:Overbar is defined as

z=1Nn=1Nzn

and its expectation value will be just the first moment:

z=eiμσ2/2.

In other words, Template:Overbar is an unbiased estimator of the first moment. If we assume that the mean μ lies in the interval [−ππ), then Arg Template:Overbar will be a (biased) estimator of the mean μ.

Viewing the zn as a set of vectors in the complex plane, the Template:Overbar2 statistic is the square of the length of the averaged vector:

R2=zz*=(1Nn=1Ncosθn)2+(1Nn=1Nsinθn)2

and its expected value is:

R2=1N+N1Neσ2

In other words, the statistic

Re2=NN1(R21N)

will be an unbiased estimator of eσ2, and ln(1/Re2) will be a (biased) estimator of σ2

Entropy

The information entropy of the wrapped normal distribution is defined as:[1]

H=ΓfWN(θ;μ,σ)ln(fWN(θ;μ,σ))dθ

where Γ is any interval of length 2π. Defining z=ei(θμ) and q=eσ2, the Jacobi triple product representation for the wrapped normal is:

fWN(θ;μ,σ)=ϕ(q)2πm=1(1+qm1/2z)(1+qm1/2z1)

where ϕ(q) is the Euler function. The logarithm of the density of the wrapped normal distribution may be written:

ln(fWN(θ;μ,σ))=ln(ϕ(q)2π)+m=1ln(1+qm1/2z)+m=1ln(1+qm1/2z1)

Using the series expansion for the logarithm:

ln(1+x)=k=1(1)kkxk

the logarithmic sums may be written as:

m=1ln(1+qm1/2z±1)=m=1k=1(1)kkqmkk/2z±k=k=1(1)kkqk/21qkz±k

so that the logarithm of density of the wrapped normal distribution may be written as:

ln(fWN(θ;μ,σ))=ln(ϕ(q)2π)k=1(1)kkqk/21qk(zk+zk)

which is essentially a Fourier series in θ. Using the characteristic function representation for the wrapped normal distribution in the left side of the integral:

fWN(θ;μ,σ)=12πn=qn2/2zn

the entropy may be written:

H=ln(ϕ(q)2π)+12πΓ(n=k=1(1)kkq(n2+k)/21qk(zn+k+znk))dθ

which may be integrated to yield:

H=ln(ϕ(q)2π)+2k=1(1)kkq(k2+k)/21qk

See also

References

Template:More footnotes

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