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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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Calculus of Variations - Function of y and y' only

I have the following problem: $\int^\pi_0 (4y^2-y'^2)dx$ which satisfies: $y=1$ on $x=0$ and $y'=0$ on $x=\pi$. I am to show that the solution is $y=cos(2x)$. Now, I first realised that the integrand is a function of $y$ and $y'$ only, so the usual…
Keir Simmons
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Meaning of an Extremum of a Functional

Consider the following minimisation problem: $$\int_0^3\left(0.5\dot{x}^2-x\right)\,\mathrm{dt}$$ Subject to $x_0=0$ and $\dot{x}=0$. Using the Euler lagrange equation one can get: $$\frac{d^2x}{dt^2}=-1$$ The solution of the ODE…
fobos3
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Finding function that maximizes ratio of area to length

I'm new to variational analysis, so I need someone to check, if I'm going in the right direction. Let's say I need to find a curve $y(x)$ with $y(0) = 1$ and $y(1) = 0$ that maximizes ratio of area (enclosed by a curve and $x$-axis) to length of…
user75619
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Calculation of the second variation of the functional $I(y)=\int_{-1}^1 [x^2(y')^2+x(y')^3]\,dx$

My question: I don't understand the last equation about second variation. According to definition, shouldn't it be $\int_{-1}^1 [2x^2+6xy'] (\eta)^2$? Can anyone help me with this? Where am I wrong?
Sherry
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Differentiation under the integral sign problem

I have to take the derivative of the following function with respect to $\varepsilon$: $$\phi(\varepsilon)=\int_{a}^{b+\varepsilon C}F(x, y(x)+\varepsilon\eta(x), y'(x)+\varepsilon\eta'(x))\;dx$$ My study material says that it should be:…
jjepsuomi
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Is it possible to solve for $y(x)$ from $\min \int _a^bf(x^2+y^2)\sqrt{1+y'^2}\;dx$

I have the following problem: Show that if in $$ \min \int_a^b f(x^2+y(x)^2)\sqrt{1+y'(x)^2}\;dx$$ polar coordinates are used, then the problem will be converted into one that contains no independent variable. Solve it to optimality. and I …
jjepsuomi
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How to find the curve extremizing a given functional?

Given a functional $$I(y)=\int_1^2 {\frac {\sqrt{1+(y'(x))^2}}{x}}dx ,$$ with $y(1)=0$ and $y(2)=1$. How to find the curve extremizing this functional?
Praveen
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Find the minimum of $J = \int_{x_a}^{x_b} [1 + (\frac{dy}{dx})^2]^\frac{1}{2}dx$ with respect to $y(x)$.

Find $y(x)$ such that the Euclidean distance between $(x_a, y(x_a))$ and $(x_b,y(x_b))$ is a minimum, i.e., find the minimum of $$J = \int_{x_a}^{x_b} \left[1 + \left(\frac{dy}{dx}\right)^2\right]^\frac{1}{2}dx$$ with respect to $y(x)$. So far I…
yub yub
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Derive Euler-Lagrange equation involving Dirac delta

I tried to derive Euler-Lagrange from a functional: $E(\phi) = \int_{\Omega} |\nabla \phi | \delta(\phi) dx$ where $\phi$ is real-valued function depending on $x$. I denote $F(\phi, \nabla\phi) = |\nabla \phi | \delta(\phi)$ and I tried to follow…
Teddy
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Variation of a functional

I have to find the variation of the following functional: There are two conditions a > 0 and b > 0. The question is "find the differential equation with respect to x(t), so that the functional is minimized".
Pekov
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Shortest distance between $\frac{x^2}{25}+\frac{y^2}{16}+\frac{z^2}9=1$ and $x^2+y^2+z^2=4$ by the calculus of variations

Find the shortest distance between the surfaces $$\frac{x^2}{25}+\frac{y^2}{16}+\frac{z^2}{9}=1 \qquad\text{and}\qquad x^2+y^2+z^2=4.$$ I tried to solve this problem as follows: The problem reduces to testing for an extremum of the…
Venkatesan Murugesan
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Difficult Problem on Calculus of variation

Consider the functional $$J(y)=y^2(1)+\int_0^1 y'^2(x) \ dx$$ with $y(0)=1$ where $y\in C^2[0,1]$. If $y$ extremizes $J$ then find $y$. Any hint will be appreciated.
user157012
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Domain and Range of a Functional

Define the functional $$F[y] = \int_0^1 f(x,y)p(x) \, dx$$ 1)What is the domain and range of the functional if $p(x) = 1$? 2)How does it change for more general functions $ρ$? My work: 1) The domain is all $C^0$ functions defined on $[0,1]$ and…
3141
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Variation of Dido's problem

Find curve of given length $l<2 R$ that maximizes area enclosed between it and arc of circle radius $R$ while passing through two circle points $A,B$ not lying on the x-axis.
Narasimham
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