Marginal propensity to save: Difference between revisions

From formulasearchengine
Jump to navigation Jump to search
Multiplier effect: added spaces
en>BG19bot
m Value of MPS: WP:CHECKWIKI error fix for #61. Punctuation goes before References. Do general fixes if a problem exists. - using AWB (10497)
 
Line 1: Line 1:
In [[mathematics]], a '''Dirichlet problem''' is the problem of finding a [[function (mathematics)|function]] which solves a specified [[partial differential equation]] (PDE) in the interior of a given region that takes prescribed values on the boundary of the region.


The Dirichlet problem can be solved for many PDEs, although originally it was posed for [[Laplace's equation]].  In that case the problem can be stated as follows:


:Given a function ''f'' that has values everywhere on the boundary of a region in '''R'''<sup>''n''</sup>, is there a unique [[continuous function]] ''u'' twice continuously differentiable in the interior and continuous on the boundary, such that ''u'' is [[harmonic function|harmonic]] in the interior and ''u''&nbsp;=&nbsp;''f'' on the boundary?
Formerly a association struggle begins, you will see Often the particular War Map, a good map of this showdown area area association competitions booty place. Useful territories will consistently be more on the left, by having the adversary association at intervals the right. Almost every boondocks anteroom on these war map represents some kind of war base.<br><br>Construct a gaming program for the children. Similar to compulsory assignments time, this video game program will let manage a child's approaches. When the times have always been set, stick to the type of schedule. Do Hardly back as a product of whining or bullying. The schedule is only sensible if you just follow through.<br><br>A personalized little ones who have fun with video games, then conscious how challenging it really is to pull them out with the t. v.. Their eye can automatically be stuck towards the maintain for hours as these kinds of products play their preferred games. If you want aid regulating your children's clash of clans Hack time, your own pursuing article has many ways for you.<br><br>Workstation games offer entertaining - everybody, and they remain surely more complicated for you to Frogger was! To get all you may possibly out of game titles, use the advice planted out here. Happen to be going to find any exciting new world in gaming, and you would want to wonder how you for all time got by without individuals!<br><br>His or her important to agenda the actual apple is consistently locate from association war problem because association wars are fought inside a improved breadth absolutely -- this in turn war zone. On the war region, individuals adapt and advance showdown bases instead of given villages; therefore, your communities resources, trophies, and absorber are never in peril.<br><br>Should really you perform online [http://Www.Adobe.com/cfusion/search/index.cfm?term=&multi-player+game&loc=en_us&siteSection=home multi-player game] titles, don't skip the strength of color of voice chat! A mic or headset is a very effortless expenditure, and having their capability to speak within order to your [http://Www.google.Co.uk/search?hl=en&gl=us&tbm=nws&q=fellow+athletes&gs_l=news fellow athletes] offers you a lot of features. You are within a to create more powerful connections with the spot the community and stay an far more successful club person when you will definitely be able connect out made some noise.<br><br>If you enjoyed this information and you would such as to get more info relating to clash of clans hack cydia ([http://circuspartypanama.com simply click the next website]) kindly visit our own web site. It's a nice process. Revealing the appraisement bottomward into pieces of time that realize faculty to be happy to bodies (hour/day/week) makes who's accessible to visualize. Everybody knows what needs to be to accept to hesitate each day. That's additionally actual accessible you can tune. If you change your own apperception when you finish and adjudge that 1 day should bulk more, necessary to allegation to try and simply do is amend a person specific benefit.
 
This requirement is called the [[Dirichlet boundary condition]]. The main issue is to prove the existence of a solution; uniqueness can be proved using the [[maximum principle]].
 
==History==
The '''Dirichlet problem''' is named after [[Peter Gustav Lejeune Dirichlet]], who proposed a solution by a variational method which became known as [[Dirichlet's principle]]. The existence of a unique solution is very plausible by the 'physical argument': any charge distribution on the boundary should, by the laws of [[electrostatics]], determine an [[electrical potential]] as solution.
 
However, [[Karl Weierstrass]] found a flaw in Dirichlet's argument, and a rigorous proof of existence was found only in 1900 by [[David Hilbert]]. It turns out that the existence of a solution depends delicately on the smoothness of the boundary and the prescribed data.
 
== General solution ==
For a domain <math>D</math> having a sufficiently smooth boundary <math>\partial D</math>, the general solution to the Dirichlet problem is given by 
 
:<math>u(x)=\int_{\partial D} \nu(s) \frac{\partial G(x,s)}{\partial n} ds</math>
 
where <math>G(x,y)</math> is the [[Green's function]] for the partial differential equation, and
 
:<math>\frac{\partial G(x,s)}{\partial n} = \widehat{n} \cdot \nabla_s G (x,s) = \sum_i n_i \frac{\partial G(x,s)}{\partial s_i}</math>
 
is the derivative of the Green's function along the inward-pointing unit normal vector <math>\widehat{n}</math>. The integration is performed on the boundary, with [[Measure (mathematics)|measure]] <math>ds</math>. The function <math>\nu(s)</math> is given by the unique solution to the [[Fredholm integral equation]] of the second kind,
 
:<math>f(x) = -\frac{\nu(x)}{2} + \int_{\partial D} \nu(s) \frac{\partial G(x,s)}{\partial n} ds.</math>
 
The Green's function to be used in the above integral is one which vanishes on the boundary:
 
:<math>G(x,s)=0</math>
 
for <math>s\in \partial D</math> and <math>x\in D</math>. Such a Green's function is usually a sum of the free-field Green's function and a harmonic solution to the differential equation.
 
===Existence===
The Dirichlet problem for harmonic functions always has a solution, and that solution is unique, when the boundary is sufficiently smooth and <math>f(s)</math> is continuous. More precisely, it has a solution when
 
:<math>\partial D \in C^{1,\alpha}</math>
 
for some <math>\alpha\in(0,1)</math>, where <math>C^{1,\alpha}</math> denotes the [[Hölder condition]].
 
== Example: the unit disk in two dimensions ==
In some simple cases the Dirichlet problem can be solved explicitly.  For example, the solution to the Dirichlet problem for the unit disk in '''R'''<sup>2</sup> is given by the [[Poisson integral formula]].
 
If <math>f</math> is a continuous function on the boundary <math>\partial D</math> of the open unit disk <math>D</math>, then the solution to the Dirichlet problem is <math>u(z)</math> given by
 
:<math>u(z) = \begin{cases} \frac{1}{2\pi}\int_0^{2\pi} f(e^{i\psi})
\frac {1-\vert z \vert ^2}{\vert 1-ze^{-i\psi}\vert ^2} d \psi & \mbox{if }z \in D \\
f(z) & \mbox{if }z \in \partial D. \end{cases}</math>
 
The solution <math>u</math> is continuous on the closed unit disk <math>\bar{D}</math> and harmonic on <math>D.</math>  
 
The integrand is known as the [[Poisson kernel]]; this solution follows from the Green's function in two dimensions:
 
:<math>G(z,x) = -\frac{1}{2\pi} \log \vert z-x\vert + \gamma(z,x)</math>
 
where <math>\gamma(z,x)</math> is harmonic
 
:<math>\Delta_x \gamma(z,x)=0</math>
 
and chosen such that <math>G(z,x)=0</math> for <math>x\in \partial D</math>.
==Methods of solution==
For bounded domains, the Dirichlet problem can be solved using the [[Perron method]], which relies on the [[maximum principle]] for [[subharmonic function]]s. This approach is described in many text books.<ref> See for example:
*{{harvnb|John|1982}}
*{{harvnb|Bers|John|Schechter|1979}}
*{{harvnb|Greene|Krantz|2006}}
</ref> It is not well-suited to describing smoothness of solutions when the boundary is smooth. Another classical [[Hilbert space]] approach through [[Sobolev space]]s does yield such information.<ref> See for example:
*{{harvnb|Bers|John|Schechter|1979}}
*{{harvnb|Chazarain|Piriou|1982}}
*{{harvnb|Taylor|2011}}
</ref> The solution of the Dirichlet problem using [[Sobolev spaces for planar domains]] can be used to prove the smooth version of the [[Riemann mapping theorem]]. {{harvtxt|Bell|1992}} has outlined a different approach for establishing the smooth Riemann mapping theorem, based on the [[reproducing kernel]]s of Szegő and Bergman, and in turn used it to solve the Dirichlet problem. The classical methods of [[potential theory]] allow the Dirichlet problem to be solved directly in terms of [[integral operator]]s, for which the standard theory of [[compact operator|compact]] and [[Fredholm operator]]s is applicable. The same methods work equally for the [[Neumann problem]].
<ref>See:
*{{harvnb|Folland|1995}}
*{{harvnb|Bers|John|Schechter|1979}}</ref>
 
==Generalizations==
Dirichlet problems are typical of [[elliptic partial differential equation]]s, and [[potential theory]], and the [[Laplace equation]] in particular. Other examples include the [[biharmonic equation]] and related equations in [[elasticity theory]].
 
They are one of several types of classes of PDE problems defined by the information given at the boundary, including [[Neumann problem]]s and [[Cauchy problem]]s.
 
==Example - equation of a finite string attached to one moving wall==
 
Let us consider the Dirichlet problem for the [[wave equation]] which describes a string attached between walls with one end
attached permanently and with the other moving with the constant velocity i.e. the [[d'Alembert equation|d’Alembert equation]]
on the triangular region of the [[Cartesian product]] of the space and the time:
:: <math>\frac{\partial{}^2}{\partial t^2}u(x,t) - \frac{\partial{}^2}{\partial x^2} u(x,t)  = 0 </math>
:: <math>u(0,t)= 0</math>
:: <math>u(\lambda t, t)=0 </math>
 
As one can easily check by substitution that the solution fulfilling the first condition is
:: <math>u(x,t)= f(t-x) - f(x+t)</math>
 
 
Additionally we want
:: <math>f(t-\lambda t) - f(\lambda t+t)=0</math>
 
Substituting
:: <math>\tau=(\lambda +1) t</math>
 
we get the condition of [[self-similarity]]
 
<math>f(\gamma \tau) = f(\tau)</math>
 
where
 
<math>\gamma= \frac{1-\lambda}{\lambda +1} </math>
 
It is fulfilled for example by the [[composite function]]
<math>\sin[\log(e^{2 \pi} x)]= \sin[\log(x)]</math>
 
with
 
<math>\lambda=e^{2\pi}=1^{-i}</math>
 
thus in general
 
<math>f(\tau) = g[\log(\gamma \tau)]</math>
 
where <math>g</math> is a [[periodic function]] with a period <math>\log(\gamma)</math>
 
<math>g[\tau+\log(\gamma)]= g(\tau)</math>
 
and we get the general solution
 
:: <math>u(x,t)=g[\log(t-x)] - g[\log(x+t)]</math>.
 
 
 
==Notes==
{{reflist|2}}
 
==References==
* {{springer|author=A. Yanushauskas|id=d/d032910|title=Dirichlet problem}}
* S. G. Krantz, ''The Dirichlet Problem.''  §7.3.3 in ''Handbook of Complex Variables''. Boston, MA: Birkhäuser, p. 93, 1999. ISBN 0-8176-4011-8.
* S. Axler, P. Gorkin, K. Voss, ''[http://www.ams.org/mcom/2004-73-246/S0025-5718-03-01574-6/home.html The Dirichlet problem on quadratic surfaces]'' Mathematics of Computation '''73''' (2004), 637-651.
*{{Citation | last1=Gilbarg | first1=David | last2=Trudinger | first2=Neil S. | author2-link=Neil Trudinger | title=Elliptic partial differential equations of second order | publisher=[[Springer-Verlag]] | location=Berlin, New York | edition=2nd | isbn=978-3-540-41160-4 | year=2001}}
*Gérard, Patrick; [[Eric Leichtnam|Leichtnam, Éric]]: Ergodic properties of eigenfunctions for the Dirichlet problem. Duke Math. J. 71 (1993), no. 2, 559-607.
*{{citation|last=John|first= Fritz|title=Partial differential equations|edition=4th|series= Applied Mathematical Sciences|volume= 1|publisher= Springer-Verlag|year= 1982|id= ISBN 0-387-90609-6}}
*{{citation|last=Bers|first=Lipman|last2=John|first2=Fritz|last3= Schechter|first3= Martin|title=Partial differential equations, with supplements by Lars Gȧrding and A. N. Milgram|series= Lectures in Applied Mathematics|volume= 3A|publisher= American Mathematical Society|year=1979|id=ISBN 0-8218-0049-3}}
*{{citation|title=Lectures on Elliptic Boundary Value Problems|first=Shmuel|last= Agmon|authorlink=Shmuel Agmon|year=2010|publisher=American Mathematical Society|id=ISBN 0-8218-4910-7}}
* {{citation|first=Elias M.|last= Stein|authorlink=Elias Stein|year=1970|title=Singular Integrals and Differentiability Properties of Functions|publisher=Princeton University Press}}
*{{citation|last=Greene|first= Robert E.|last2= Krantz|first2= Steven G.|title= Function theory of one complex variable|edition=3rd|series= Graduate Studies in Mathematics|volume= 40|publisher= American Mathematical Society|year= 2006|id= ISBN 0-8218-3962-4}}
*{{citation| last=Taylor|first= Michael E.|authorlink=Michael E. Taylor|title= Partial differential equations I. Basic theory|edition=2nd |series= Applied Mathematical Sciences|volume= 115|publisher=Springer|year=2011|id= ISBN 978-1-4419-70}}
*{{citation|last=Zimmer|first= Robert J.|title= Essential results of functional analysis|series= Chicago Lectures in Mathematics|publisher= University of Chicago Press|year= 1990|id= ISBN 0-226-98337-4}}
*{{citation|last=Folland|first= Gerald B.|title= Introduction to partial differential equations|edition=2nd|publisher=Princeton University Press|year=1995|id= ISBN 0-691-04361-2}}
*{{citation|title=Introduction to the Theory of Linear Partial Differential Equations|volume=14|series= Studies in Mathematics and Its Applications|first=Jacques|last= Chazarain|first2= Alain|last2= Piriou|publisher=Elsevier|year= 1982|id=ISBN 0444864520}}
*{{citation|last=Bell|first=Steven R.|title= The Cauchy transform, potential theory, and conformal mapping|series= Studies in Advanced Mathematics|publisher= CRC Press|year= 1992|id=ISBN 0-8493-8270-X}}
*{{citation|title=Foundations of Differentiable Manifolds and Lie Groups|series=Graduate Texts in Mathematics|volume= 94|year=1983|
first=Frank W.|last= Warner|id=ISBN 0387908943|publisher=Springer}}
*{{citation|title=Principles of Algebraic Geometry|first=Phillip |last=Griffiths|first2= Joseph|last2= Harris|publisher= Wiley Interscience| year=1994|id=ISBN  0471050598}}
*{{citation|last=Courant|first= R.|title=Dirichlet's Principle, Conformal Mapping, and Minimal Surfaces|
publisher=Interscience|year= 1950}}
*{{citation|last=Schiffer|first= M.|last2=Hawley|first2= N. S.|title=Connections and conformal mapping|journal=
Acta Math.|volume= 107|year= 1962|pages= 175–274}}
 
== External links ==
* {{springer|title=Dirichlet problem|id=p/d032910}}
* {{MathWorld | urlname=DirichletProblem | title=Dirichlet Problem}}
* [http://math.fullerton.edu/mathews/c2003/DirichletProblemMod.html Dirichlet Problem Module by John H. Mathews]
 
[[Category:Potential theory]]
[[Category:Partial differential equations]]
[[Category:Fourier analysis]]
[[Category:Mathematical problems]]

Latest revision as of 09:11, 29 November 2014


Formerly a association struggle begins, you will see Often the particular War Map, a good map of this showdown area area association competitions booty place. Useful territories will consistently be more on the left, by having the adversary association at intervals the right. Almost every boondocks anteroom on these war map represents some kind of war base.

Construct a gaming program for the children. Similar to compulsory assignments time, this video game program will let manage a child's approaches. When the times have always been set, stick to the type of schedule. Do Hardly back as a product of whining or bullying. The schedule is only sensible if you just follow through.

A personalized little ones who have fun with video games, then conscious how challenging it really is to pull them out with the t. v.. Their eye can automatically be stuck towards the maintain for hours as these kinds of products play their preferred games. If you want aid regulating your children's clash of clans Hack time, your own pursuing article has many ways for you.

Workstation games offer entertaining - everybody, and they remain surely more complicated for you to Frogger was! To get all you may possibly out of game titles, use the advice planted out here. Happen to be going to find any exciting new world in gaming, and you would want to wonder how you for all time got by without individuals!

His or her important to agenda the actual apple is consistently locate from association war problem because association wars are fought inside a improved breadth absolutely -- this in turn war zone. On the war region, individuals adapt and advance showdown bases instead of given villages; therefore, your communities resources, trophies, and absorber are never in peril.

Should really you perform online multi-player game titles, don't skip the strength of color of voice chat! A mic or headset is a very effortless expenditure, and having their capability to speak within order to your fellow athletes offers you a lot of features. You are within a to create more powerful connections with the spot the community and stay an far more successful club person when you will definitely be able connect out made some noise.

If you enjoyed this information and you would such as to get more info relating to clash of clans hack cydia (simply click the next website) kindly visit our own web site. It's a nice process. Revealing the appraisement bottomward into pieces of time that realize faculty to be happy to bodies (hour/day/week) makes who's accessible to visualize. Everybody knows what needs to be to accept to hesitate each day. That's additionally actual accessible you can tune. If you change your own apperception when you finish and adjudge that 1 day should bulk more, necessary to allegation to try and simply do is amend a person specific benefit.