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

votes

2 answers

How to solve this functional problem?

I am new to calculus of variations, till now I know how to get the extremal functions for a given functional using Euler-Lagrange equation. What if I have a functional but I am not looking for minimizing/maximizing it, but instead solving equations…

calculus-of-variations

asked Jun 23 '16 at 00:02

Freshman42

votes

1 answer

Weakening the Fundamental Lemma of Calculus of Variations

The Fundamental Lemma of Calculus of Variation says that if a continuous function $f$ on an open interval $(a,b)$ satisfies the equality $$\int_{a}^{b} f(x) h(x) = 0$$ for all compactly supported smooth functions $h$ on $(a,b)$ then $f$ is…

calculus-of-variations

asked Feb 26 '16 at 01:12

JessicaK

7,655

votes

1 answer

Movable end points Calculus of Variation.

Given problem is $J[y] =\int_{0}^{x_1}y'^2dx$ with $y(0)=0$ and $y(x_1)=-x_1-1$. After solving Euler Lagrange equation I got $y=Ax+B$ . And using first boundry conditon I got $y=Ax$ We have transversatity condition $[F+(\phi'-y')F_{y'}]=0 $ at…

calculus-of-variations

asked Dec 13 '15 at 14:22

zafran

votes

2 answers

Calculus of variation proof confusion.

So I was reading the proof on the shortest distance between two points being a line (https://en.wikipedia.org/wiki/Calculus_of_variations#Example) but one line of the proof is baffling me. The statement is as follows: "$\frac{\partial L}{\partial…

calculus-of-variations

asked Oct 02 '15 at 02:48

Sam Spiro

votes

1 answer

Elementary Examples of Functionals

I'm working on a research project that's a little over my head, so forgive some simple questions. Is a composite function $f(g(x))$ a functional? What are a handful of other simple examples of functionals?

calculus-of-variations

asked Jun 23 '15 at 04:40

sandaga

votes

1 answer

Find maximum $\int^{1}_{0}\{f(x)\}^3dx$

I would appreciate if somebody could help me with the following problem: Question: Find maximum $\int^{1}_{0}\{f(x)\}^3dx$ when (1). $f(x) : \text{conti-and} \int^{1}_{0}f(x)dx=0$ (2). $-1\leq f(x)\leq 1 (x \in [0,1] )$ I tried but couldn’t get…

calculus-of-variations

asked Feb 16 '15 at 09:05

Young

5,492

votes

0 answers

Calculus of Variations with discontinuous Lagrangian

Consider the classical problem of extremizing a functional of the form $$S[x] = \int_a^b L\left(t,x,\dot{x}\right)\ dt.$$ In almost all cases of consideration, the integrand $L$ is considered to be a $C^2$ function of its variables and in that case…

calculus-of-variations

asked Dec 25 '14 at 15:42

EuYu

41,421

votes

1 answer

green function, functional derivative

I am trying to find ${\delta F}/{\delta u}$ for the functional: $F[u]=\int u(x)\int G(x,y)u(y)dy dx $ G is green function for laplace operator. is there Euler-Lagrange version for double intrgral? ( lagrangian: $L[x,y,u(x),u(y)]$)

calculus-of-variations

asked Aug 28 '14 at 09:23

meireles

votes

1 answer

Euler–Lagrange equation

Does this P.D.E: $$\nabla\cdot\left( \frac{ \nabla u}{u} \right)+a\, \Delta u+b\,u=0 \hspace{3cm} (*)$$ have a variational structure? Here $a$ and $b$ are constants. In other words, the question I am asking is: Does there exist a functional such…

calculus-of-variations

asked Mar 22 '14 at 21:37

LCH

votes

0 answers

Single Variable Calculus of Variations Question

Problem: Minimize $I(f)$ subject to the constraint $J(f)\leq 0$, where $$I(f)=\int_{x_1}^{x_2}\frac{dx}{f(x)}\tag{$f:[x_1,x_2]\to \mathbb{R}_{\geq 0}$}$$ $$J(f)=\left(\frac{1}{f}\frac{df}{dx}\right)^2+\frac{f^4}{g^2}-C\tag{$g:[x_1,x_2]\to…

calculus-of-variations

asked Jan 01 '14 at 01:03

Dave

votes

0 answers

Infimum of a variational integral

I'm given the following variational integral $F(u) = \int_{0}^1 \frac{[u'(x)]^2}{2} - u(x) + u^4(x) dx$ defined on the set $C = \{ u \in C^1([0,1]): u(0) = u(1) = 0 \}$ I have to show that $ -\infty < \inf\{F(u): u \in C\} < 0 $ I've already proven…

calculus-of-variations

asked Sep 18 '23 at 20:08

Ruben Palma

votes

1 answer

Motivating the Legendre Transform Mathematically

If I begin with a functional of the form $$J[y] = \smallint_a^b f(x,y,y')dx$$ & find it's Euler-Lagrange equations $$\tfrac{\partial f}{\partial y} - \tfrac{d}{dx}\tfrac{\partial f}{\partial y'} = 0 = \tfrac{d}{dx}\tfrac{\partial f}{\partial y'} -…

calculus-of-variations

asked Aug 26 '13 at 16:24

bolbteppa

4,389

votes

3 answers

Direct method for Calculus of variation for problem specifying slope and value of the function

I am looking for a direct method proof of the infimum of a calculus of variation problem. $$\inf_{u\in\scr{C}[0,1],u (0)=0}\int_0^1u^2+(u'-b)^2dx \tag 1$$ The first term wants to set $u=0$ locally, while the second term wants to set $u'=b$. There is…

calculus-of-variations

asked Sep 02 '23 at 22:16

Shoham Sen

votes

1 answer

Finding extremal for the functional $J(y)=\int_0^1y'\sqrt{1+(y'')^2}dx,$

For the functional $J$ defined by $$J(y)=\int_0^1y'\sqrt{1+(y'')^2}dx,$$Find an extremal satisfying the conditions $y(0)=0,~y'(0)=0,~y(1)=1$ and $y'(1)=2$? My attempt: Let $F(x,y,y',y'')=y'\sqrt{1+(y'')^2}$, then second order Euler's equation…

calculus-of-variations

asked Apr 27 '22 at 07:39

Messi Lio

votes

1 answer

Calculus of variation problem with integral product constraint

I want to find the extrema of the functional, $$ J[y] =\int^1_0 L(x, y(x)) \ \text{d} x $$ in the space of continuous functions $C[0, 1]$, subject to the constraint, $$ \int^1_0 \left(y(x) - \frac{1}{2}\right)^2 \text{d} x \ \times \int^1_0 y(t)…

calculus-of-variations

asked Sep 09 '21 at 13:48

NoFishLikeIan

Prev 1 2

…

21 22 Next