Questions tagged [calculus-of-variations]

This tag is for problems relating to the calculus of variations that deal with maximizing or minimizing functionals. This problem is a generalization of the problem of finding extrema of functions of several variables. In fact, these variables will themselves be functions and we will be finding extrema of “functions of functions” or functionals.

The calculus of variations seeks to minimize or maximize an entire functional's worth of parameters instead of changing just one parameter. It achieves this by applying standard calculus techniques to the integral of a functional, thereby reducing $\mathbb R \to \mathbb R$ to just one parameter $\in\mathbb R$.

In symbols one considers $\displaystyle\max \int f(x) \ker(x)$ $dx$ rather than $\max f(s)$.

Two famous applications of the calculus of variations are the brachistochrone problem and deriving the catenary shape of a rope hanging between two poles.

Some basic problems in the calculus of variations are:

$(i)$ find minimizers

$(ii)$ find necessary conditions which minimizers must satisfy

$(iii)$ find solutions (extremals) which satisfy the necessary conditions

$(iv)$ find sufficient conditions which guarantee that such solutions are minimizers

$(v)$ qualitative properties of minimizers, like regularity properties

$(vi)$ how do the minimizers depend on parameters?

$(vii)$ stability of extremals depending on parameters.

Application: A huge number of problems in the calculus of variations have their origin in physics where one has to minimize the energy associated to the problem under consideration. Nowadays many problems come from economics.

References:

https://en.wikipedia.org/wiki/Calculus_of_variations

http://mathworld.wolfram.com/CalculusofVariations.html

http://www.math.uni-leipzig.de/~miersemann/variabook.pdf

2968 questions

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1 answer

Finding minimal area of a cylindrically symmetric surface

I am told that I have a cylindrically symmetric surface that is bounded between two circles $r=a$ at $z=\pm b$. I'm meant to use the Euler-Lagrange equation, so I'm trying to a functional for the area of a given surface. I tried to find the surface…

calculus-of-variations

asked Dec 12 '15 at 12:18

Guest195

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1 answer

Calculate $\Delta J$ for a functional

$J(y)=\int_{0}^{1} (x^2-y^2+(y')^2)dx$ $y(x)=x, h(x)=x^2$ I need to calculate $\Delta J$ and I am given this from the answer key: $\Delta J = J(y + \epsilon h)-J(y) = J(x + \epsilon x^2) - J(x)$ I just need to verify that this comes out to: $\Delta…

calculus-of-variations

asked Dec 02 '15 at 00:00

MC989

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1 answer

variational calculus with probabilistic boundaries

I'm interested to find the solution to the following variational problem: $$ J[y]=\int_{T=0}^{\infty}\int_{t=0}^{T}L(t,y(t),y'(t))p(T)dtdT $$ where $p(T)$ is a probability distribution function over $T$ ($T$ is greater than zero). My question is…

calculus-of-variations

asked Nov 17 '15 at 10:17

Amir Dezfouli

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1 answer

Consider the functional $J(y)=\int_{a}^{b}F(x,y,y')dx$.

Where , $$F(x,y,y')=y'+y$$ for admissible function $y$. Then what is the extremal. I did the solution using the special case of Euler-Lagrange equation where the $x$ is missing and arrived at the result $y(x)=c$ is the extremal. But while checking…

calculus-of-variations

asked Sep 21 '15 at 14:33

Kushal Bhuyan

7,110

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1 answer

Variational calculus - inequality

Let $u \in L^1_{loc}(\Omega)$, and suppose that $\int _{\Omega} u(x)\eta (x)\; dx \geq 0$, $\forall \eta \in C ^{\infty}_{0} (\Omega)$ . Then $u(x) \geq 0$ , a. e. $x \in\Omega$

calculus-of-variations

asked Aug 27 '15 at 00:24

G.Castre

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0 answers

Calculus of Variations transformation

In the Calculus of Variations book by Gelfand and Fomin it says to consider the transformation $$x^{*} = \Phi(x,y,y')$$ $$y^{*} = \Psi(x,y,y').$$ Here it seems that $y'$ is the derivative of $y$ with respect to $x$. This doesn't make any sense to…

calculus-of-variations

asked Jul 26 '15 at 18:36

Joe

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1 answer

Euler-Lagrange equation with constraints outside the integral

So I've been studying Euler-Lagrange equations, and on an assignment I have the problem to find them for $J(y)=\int_a^bF(x,y,y')dx-By(b)+Ay(a)$ Where $y(a)$ and $y(b)$ are free, $A$ and $B$ are constant. Without those terms outside the integral,…

calculus-of-variations

asked Jun 13 '15 at 22:13

user2085282

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1 answer

An MCQ involving Rayleigh - Ritz method for the functional $I(y) = \int_{0}^{1}(\frac{1}{2}(y^{'})^2 - y)dx$

An MCQ involving Rayleigh - Ritz method for the functional $$I(y) = \int_{0}^{1}(\frac{1}{2}(y^{'})^2 - y)dx$$ Let $y_\text{app}$ be polynomial approximation, involving only one coordinate function, for the functional $$I(y) = \int_0^1…

calculus-of-variations

asked May 23 '15 at 15:02

user242028

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1 answer

How to calculate difference between two points in some values?

I have 5 values which are -2, -1, 0, 1, 2. I want to calculate difference between two variables which contains the values from these given values. Suppose I have two variables x and y. Suppose following cases : x = 0, y = 0 i.e. (x == y) then…

calculus-of-variations

asked May 06 '15 at 14:02

Sumit Madan

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0 answers

Question about ellipses and calculus of variations

I don't know much about calculus of variation, but I think it applies to a problem I've come across. If you have a closed loop in a 2 dimensional space defined by some parametric equation r(t), is there some minimization or maximization of…

calculus-of-variations

asked Mar 01 '12 at 01:52

Andd

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1 answer

Maximum moment of inertia of arc

Is there is variational calculus solution to the problem of maximum moment of inertia of a wire of uniform density per unit length $s$ between two fixed endpoints, about z-axis in 3-Space? Considering cylindrical coordinates: $\int ( \sqrt{(…

calculus-of-variations

asked Dec 29 '14 at 05:32

Narasimham

40,495

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2 answers

Does the square root function change the variations of a function?

If I have $$f(x) =\sqrt{g(x)}$$ Will the variations of $f(x)$ be the same than the variations of $g(x)$ ?

calculus-of-variations

asked Sep 18 '14 at 19:53

Pop Flamingo

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1 answer

isoperimetric problem:how to solve the given question

Determine $y(x)$ for which $\int_{0}^{1} x^{2} + y^{'2}dx$ is stationary, subject to $\int_{0}^{1}y^2=2$, $y(0) = 0$, $ y(1) = 0$. how to solve it? I tried it: $f=x^{2} + y^{'2}$ and $g=y^2$ then $H=x^{2} + y^{'2}+\lambda y^2 $ then using euler's…

calculus-of-variations

asked Sep 01 '14 at 11:42

amit

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0 answers

Rayleigh-Ritz-method-how to solve the given problem

how to solve this: An approximate solution of the problem $y^"-y^{'}+4x\epsilon^x =0$, $y^{'}(0)-y(0)=1$,$y^{'}(1)+y(1)=-\epsilon$ is: here we have to calculate the value of y(x)? what i did is: for this we use rayleigh-Ritz method, and i got the…

calculus-of-variations

asked Sep 01 '14 at 09:41

amit

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1 answer

Maximization of ratio of two functionals

I am trying to find a function prescribed in polar coordinates $r = f(\theta)$ that maximizes the following quantity $$\frac{\int_0^{2\pi}r^3\cos\theta\, d\theta}{\int_0^{2\pi}r^4\, d\theta}$$ subject to the constraint $r \leq R \quad \forall \theta…

calculus-of-variations

asked Aug 27 '14 at 09:25

Calculon

5,725

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