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| == '''[[The Social Capital Foundation]]''' == | | == '''[[Associated Legendre function]]''' == |
| ''by [[User:Koen Demol|Koen Demol]] | | ''by [[User:Paul Wormer|Paul Wormer]] |
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| '''The Social Capital Foundation''' (TSCF) is a non-profit, [[non-governmental organization]] (NGO) that pursues the promotion of [[social capital]] and [[social cohesion]]. Created in late 2002 by Dr [[Patrick Hunout]], it is based in [[Brussels]]. TSCF is international and focuses particularly on the current developments in the industrial countries. The profiles of its members are extremely diverse. Funded with membership, conference and expertise fees, it is an independent [[operating foundation]]. It is a not a [[grant-making foundation]]. | | In [[mathematics]] and [[physics]], an '''associated Legendre function''' ''P''<sub>''ℓ''</sub><sup>''m''</sup> is related to a [[Legendre polynomial]] ''P''<sub>''ℓ''</sub> by the following equation |
| | :<math> |
| | P^{m}_\ell(x) = (1-x^2)^{m/2} \frac{d^m P_\ell(x)}{dx^m}, \qquad 0 \le m \le \ell. |
| | </math> |
| | Although extensions are possible, in this article ''ℓ'' and ''m'' are restricted to integer numbers. For even ''m'' the associated Legendre function is a polynomial, for odd ''m'' the function contains the factor (1−''x'' ² )<sup>½</sup> and hence is not a polynomial. |
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| Social capital is a key concept in [[political science]], [[sociology]], [[social psychology]], [[economics]], and organizational behavior. It has been theorized about by a long list of scholars, from Emile Durkheim to Ferdinand Tönnies, Pierre Bourdieu, Robert Putnam, Robert Bellah, Francis Fukuyama, Patrick Hunout and others. (See the entry on [[social capital]] for more detailed discussion).
| | The associated Legendre functions are important in [[quantum mechanics]] and [[potential theory]]. |
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| === The Foundation's approach to social capital ===
| | According to Ferrers<ref> N. M. Ferrers, ''An Elementary Treatise on Spherical Harmonics'', MacMillan, 1877 (London), p. 77. [http://www.archive.org/stream/elementarytreati00ferriala#page/2/mode/2up Online].</ref> the polynomials were named "Associated Legendre functions" by the British mathematician [[Isaac Todhunter]] in 1875,<ref>I. Todhunter, ''An Elementary Treatise on Laplace's, Lamé's, and Bessel's Functions'', MacMillan, 1875 (London). In fact, Todhunter called the Legendre polynomials "Legendre coefficients". </ref> where "associated function" is Todhunter's translation of the German term ''zugeordnete Function'', coined in 1861 by [[Heinrich Eduard Heine|Heine]],<ref> E. Heine, ''Handbuch der Kugelfunctionen'', G. Reimer, 1861 (Berlin).[http://books.google.com/books?id=YE8DAAAAQAAJ&pg=PA3&dq=Eduard+Heine&hl=en#PPR1,M1 Google book online]</ref> and "Legendre" is in honor of the French mathematician [[Adrien-Marie Legendre]] (1752–1833), who was the first to introduce and study the functions. |
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| TSCF's approach to "social capital" is distinct from other, more socio-economic approaches in which the term "capital" approaches some of its conventional economic meanings. TSCF promotes social capital defined as a set of mental dispositions and attitudes favoring cooperative behaviors within society.
| | ===Differential equation=== |
| | Define |
| | :<math> |
| | \Pi^{m}_\ell(x) \equiv \frac{d^m P_\ell(x)}{dx^m}, |
| | </math> |
| | where ''P''<sub>''ℓ''</sub>(''x'') is a Legendre polynomial. |
| | Differentiating the [[Legendre polynomials#differential equation|Legendre differential equation]]: |
| | :<math> |
| | (1-x^2) \frac{d^2 \Pi^{0}_\ell(x)}{dx^2} - 2 x \frac{d\Pi^{0}_\ell(x)}{dx} + \ell(\ell+1) |
| | \Pi^{0}_\ell(x) = 0, |
| | </math> |
| | ''m'' times gives an equation for Π<sup>''m''</sup><sub>''l''</sub> |
| | :<math> |
| | (1-x^2) \frac{d^2 \Pi^{m}_\ell(x)}{dx^2} - 2(m+1) x \frac{d\Pi^{m}_\ell(x)}{dx} + \left[\ell(\ell+1) |
| | -m(m+1) \right] \Pi^{m}_\ell(x) = 0 . |
| | </math> |
| | After substitution of |
| | :<math> |
| | \Pi^{m}_\ell(x) = (1-x^2)^{-m/2} P^{m}_\ell(x), |
| | </math> |
| | and after multiplying through with <math>(1-x^2)^{m/2}</math>, we find the ''associated Legendre differential equation'': |
| | :<math> |
| | (1-x^2) \frac{d^2 P^{m}_\ell(x)}{dx^2} -2x\frac{d P^{m}_\ell(x)}{dx} + |
| | \left[ \ell(\ell+1) - \frac{m^2}{1-x^2}\right] P^{m}_\ell(x)= 0 . |
| | </math> |
| | One often finds the equation written in the following equivalent way |
| | :<math> |
| | \left( (1-x^{2})\; y\,' \right)' +\left( \ell(\ell+1) |
| | -\frac{m^{2} }{1-x^{2} } \right) y=0, |
| | </math> |
| | where the primes indicate differentiation with respect to ''x''. |
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| The first assumption on which this definition is based is that social capital must not be mixed up with its manifestations.
| | In physical applications it is usually the case that ''x'' = cosθ, then the associated Legendre differential equation takes the form |
| | :<math> |
| | \frac{1}{\sin \theta}\frac{d}{d\theta} \sin\theta \frac{d}{d\theta}P^{m}_\ell |
| | +\left[ \ell(\ell+1) - \frac{m^2}{\sin^2\theta}\right] P^{m}_\ell = 0. |
| | </math> |
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| Thus, social capital does not consist primarily in the possession of social networks, but in a disposition to generate, maintain and develop congenial relationships. It is not good neighborhood, but the openness to pacific coexistence and reciprocity based on a concept of belonging. It does not consist in running negotiations, but in the shared compromise-readiness and sense of the common good that make them succeed. It is not solely observable trust, but the predictability and the good faith necessary to produce it. It is not reductible to factual civic engagement, but resides in the sense of community that gives you lust to get involved in public life. All these downstream manifestations cannot be fully and consistently explained without reference to the upstream mental patterns that make them possible, or not.
| | ''[[Associated Legendre function|.... (read more)]]'' |
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| The second assumption is that this disposition is collectivistic. It is not my individual capacity to build networks that is the most important for creating social capital but a collective, shared and reciprocal disposition to welcome, create and maintain social connections - without which my individual efforts to create such connections may well remain vain.
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| In that sense, The Social Capital Foundation's definition of social capital can be regarded as a semantic equivalent to the spirit of community. TSCF's approach is close to the one developed by [[Amitai Etzioni]] and the [[Communitarian Network]], although the concerns raised by the erosion of the community trace back to diverse figures in early modern sociology such as [[Ferdinand Tönnies]], [[Georg Simmel]], [[Emile Durkheim]] or the [[Chicago School of Sociology]], while [[European ethnology]], [[culturalism]] and [[jungism]] also insisted on the existence of a common soul.
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| TSCF promotes social capital through socio-economic research, publications, and events. The Foundation sets up international conferences on a regular basis. While research and knowledge add verified facts to the debate, social interaction contributes to further dissemination and awareness around the Foundation's approach.
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| === Hunout and the tripartite model of societal change ===
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| [[Patrick Hunout]], a Franco-Belgian researcher and policymaker, created in 1999 The International Scope Review and in 2002 The Social Capital Foundation. His theoretical filiation is both in the sociology of [[Emile Durkheim]] and [[Ferdinand Tönnies]] and in the more recent contribution of [[social psychology]] and [[cognitive psychology]] research. A former stage of his work had shown that judicial decisionmaking is only possible to the extent where judges use, beyond the formal legal provisions, impersonal and universal values as decision principles -to name these, he coined the term of "global axiological space" (1985, 1990).
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| ''[[The Social Capital Foundation|.... (read more)]]''
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| {| class="wikitable collapsible collapsed" style="width: 90%; float: center; margin: 0.5em 1em 0.8em 0px;" | | {| class="wikitable collapsible collapsed" style="width: 90%; float: center; margin: 0.5em 1em 0.8em 0px;" |
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| ! style="text-align: center;" | [[The Social Capital Foundation#Bibliography|notes]] | | ! style="text-align: center;" | [[Associated Legendre function#Reference|notes]] |
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| {{reflist|2}} | | {{reflist|2}} |
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by Paul Wormer
In mathematics and physics, an associated Legendre function Pℓm is related to a Legendre polynomial Pℓ by the following equation
Although extensions are possible, in this article ℓ and m are restricted to integer numbers. For even m the associated Legendre function is a polynomial, for odd m the function contains the factor (1−x ² )½ and hence is not a polynomial.
The associated Legendre functions are important in quantum mechanics and potential theory.
According to Ferrers[1] the polynomials were named "Associated Legendre functions" by the British mathematician Isaac Todhunter in 1875,[2] where "associated function" is Todhunter's translation of the German term zugeordnete Function, coined in 1861 by Heine,[3] and "Legendre" is in honor of the French mathematician Adrien-Marie Legendre (1752–1833), who was the first to introduce and study the functions.
Differential equation
Define
where Pℓ(x) is a Legendre polynomial.
Differentiating the Legendre differential equation:
m times gives an equation for Πml
![{\displaystyle (1-x^{2}){\frac {d^{2}\Pi _{\ell }^{m}(x)}{dx^{2}}}-2(m+1)x{\frac {d\Pi _{\ell }^{m}(x)}{dx}}+\left[\ell (\ell +1)-m(m+1)\right]\Pi _{\ell }^{m}(x)=0.}](https://wikimedia.org/api/rest_v1/media/math/render/svg/a0646d66b5288c6fcb0a223d4bd1a138025408a4)
After substitution of
and after multiplying through with 
, we find the associated Legendre differential equation:
![{\displaystyle (1-x^{2}){\frac {d^{2}P_{\ell }^{m}(x)}{dx^{2}}}-2x{\frac {dP_{\ell }^{m}(x)}{dx}}+\left[\ell (\ell +1)-{\frac {m^{2}}{1-x^{2}}}\right]P_{\ell }^{m}(x)=0.}](https://wikimedia.org/api/rest_v1/media/math/render/svg/65e0b6b6c103256a203530be670df71713f3ecd1)
One often finds the equation written in the following equivalent way
where the primes indicate differentiation with respect to x.
In physical applications it is usually the case that x = cosθ, then the associated Legendre differential equation takes the form
![{\displaystyle {\frac {1}{\sin \theta }}{\frac {d}{d\theta }}\sin \theta {\frac {d}{d\theta }}P_{\ell }^{m}+\left[\ell (\ell +1)-{\frac {m^{2}}{\sin ^{2}\theta }}\right]P_{\ell }^{m}=0.}](https://wikimedia.org/api/rest_v1/media/math/render/svg/b3db05097c0b453bec6526c7657d198a6409784d)
.... (read more)
| notes
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- ↑ N. M. Ferrers, An Elementary Treatise on Spherical Harmonics, MacMillan, 1877 (London), p. 77. Online.
- ↑ I. Todhunter, An Elementary Treatise on Laplace's, Lamé's, and Bessel's Functions, MacMillan, 1875 (London). In fact, Todhunter called the Legendre polynomials "Legendre coefficients".
- ↑ E. Heine, Handbuch der Kugelfunctionen, G. Reimer, 1861 (Berlin).Google book online
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