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Questions tagged [boundary-value-problem]

For questions concerning the properties and solutions to the boundary-value problem for differential equations. By a Boundary value problem, we mean a system of differential equations with solution and derivative values specified at more than one point. Most commonly, the solution and derivatives are specified at just two points (the boundaries) defining a two-point boundary value problem.

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Whether the solution of $\Delta u=f$ belong to $C_0^{\infty}(\Omega)$?

Assume that and $\Omega$ is a Lipschitz open bounded set , or pipe-like area such as $\{(x_1,x_2):-\infty < x_1 < +\infty, a\le x_2 \le b\}$ in ${\mathbb R}^2$. $f \in C_0^{\infty}(\Omega)$, ...
shanlilinghuo's user avatar
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What are the boundary conditions on the Green's function?

Let a linear ordinary differential equation of the form $$\frac{d^2}{dx^2}f(x) = g(x)\tag{1}$$ be given to us subject to the boundary conditions on $f(x)$ and/or $f^\prime(x)$. The most general ...
Solidification's user avatar
2 votes
1 answer
62 views

Minimum of functional with boundary conditions over twicely differentiable functions

I found a quiz that I cannot find a way to solve, and wanted to know if anyone of you has any suggestions on how to solve it. The problem is the following: find the minimum of the following functional ...
luchino_prince's user avatar
1 vote
1 answer
54 views

Deducing Equivalent Norms on Sobolev Spaces from Boundary Value Problems

In Salsa's Partial Differential Equations in Action, 3ed page 540 the following is mentioned: Let $\Omega$ be a $C^2-$ domain and $f \in L^2(\Omega)$. The Lax-Milgram Theorem and Theorem 8.28 (...
Thede's user avatar
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1 vote
1 answer
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Laplace's Equation on an annulus with Dirichlet/Neumann boundary conditions

We're given general solutions to Laplace's equation of the form $ \phi(r,\theta) = Ar^\alpha \cos(\beta \theta) $, and we're asked to find specific solutions given the boundary conditions: $ a \leq r \...
Grotto Box's user avatar
1 vote
1 answer
70 views

Solve the PDE using Direct Integration

Question: Solve for $z(x,y)$ using direct integration $\frac{\partial{^2z}}{\partial{x^2}} = a^2z$ with the conditions $\frac{\partial{z}}{\partial{x}}(0,y)=a\sin (y)$ $\frac{\partial{z}}{\partial{y}}(...
esssystephen's user avatar
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0 answers
35 views

Do additional boundary conditions affect the compact embedding of Sobolev spaces?

Suppose $\Omega \subset \mathbb{R}^2$ open bounded and sufficiently smooth with outward unit normal $\mathbf{n}$. It is known by the Rellich-Kondrachov theorem that $$ H^2(\Omega) \hookrightarrow H^1(\...
Thede's user avatar
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Green Function Expansion Theorem Proof

Let $G(t,\tau,l)$ be the Green Function associated to a differential self-adjoint eigenvalue problem: $$ \hat{L} \psi = l \psi \hspace{2mm} \text{on} \hspace{2mm} [a,b] \\ \underline{\hat{U}} \psi = \...
Matteo Menghini's user avatar
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25 views

Reduction of periodic boundary conditions to Dirichlet boundary conditions

Let us consider the following heat equation with periodic boundary conditions, which is nothing but the problem on the flat torus: $$ \partial_t u(x,t) - \partial_x^2 u(x,t) = f(x,t),(x,t) \in [0,1] \...
kumquat's user avatar
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2 answers
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Solving a boundary value problem with an integral constraint.

EDIT1: Initial post left as it, but modified below to answer comments EDIT2: the proper problem (see EDIT1) was ill-posed close to the right boundary, preventing convergence of the BVP. Changing the ...
Liris's user avatar
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1 answer
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Has anyone seen PDE involving determinant of Hessian?

Travelling through long and convoluted mathematical tracks, I have stumbled upon the following PDE. All I'm really asking is whether someone has seen this PDE before, and if it has a name. So here is ...
Daniel Goc's user avatar
1 vote
1 answer
86 views

Sturm-Liouville problem: $\frac{d}{dx}\Big(e^{2x}\frac{dy}{dx}\Big)+e^{2x}(1+\lambda)y=0$

I'm trying to solve the Sturm-Liouville problem $$\frac{d}{dx}\Big(e^{2x}\frac{dy}{dx}\Big)+e^{2x}(1+\lambda)y=0$$ with boundary conditions $y(0)=y(\pi)=0$ but i'm stuck because every reference on SL ...
injo's user avatar
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1 answer
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Determining weak solution for Dirichlet problem

Let $D$ be the unit disk in the plane and let $\Omega= D\setminus\{0\}$. The Dirichlet problem \begin{cases} Δu = 1 & \text{in } \Omega \newline u=0 & \text{on } \partial \Omega \end{cases} ...
john_psl1298's user avatar
3 votes
1 answer
85 views

Eliminating Neumann boundary condition for elliptic PDE

In his PDE book, Evans demonstrates that for elliptic PDEs with Dirichlet boundary condition, the boundary term can be eliminated: I am now wondering if this also works with Neumann boundary ...
sina1357's user avatar
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5 votes
1 answer
112 views

Help to solve the integro-differential equation $y'(x)=-k\frac{y^2(x)}{x^2}\int_0^xt^2y(t)\,dt$

I have this differential integral equation from a physics problem $y'(x)=-k\frac{y^2(x)}{x^2}\int_0^xt^2y(t)\,dt$ and i dont know how to solve such equation. Edit 3 (the third time's a charm): Comment:...
fabri bazzoni's user avatar
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0 answers
27 views

Questions regarding $C_n^1(\overline\Omega)$, the space of functions with normal derivatives

The definition of which functions have normal derivatives, and to which we can apply Green's First Identity to, seems to be very delicate. Let $\Omega$ be a $C^1$ domain in $\mathbb{R}^d$ with $d\geq ...
Geekernatir's user avatar
1 vote
0 answers
32 views

Domain Truncation Error for Semi-Infinite BVP

Suppose I have a BVP defined on a semi-infinite domain, of a form that looks something like $$ N[f] = 0 \\ f(0) = a \\f'(0) =b \\ f'(\infty) = c$$ where $f$ is some (generically nonlinear) third order ...
Cade Reinberger's user avatar
2 votes
0 answers
45 views

Existence of an unique solution of an ODE without boundary conditions

I would like to ask how to determine if there is a unique solution to an ODE that does not have any boundary conditions, nor initial conditions. It sounds weird but I wanted to know if there is a case ...
Charles Kim's user avatar
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0 answers
28 views

High order finite difference schemes for boundary value problems on a finite interval

I have some questions. I'm going to assume everything is in 1d with a Laplacian operator. If I discretize the Laplacian operator using $p = 2a+1$ grid points with periodic boundary conditions, I ...
Cuhrazatee's user avatar
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0 answers
20 views

Elliptic boundary value problem with time dependency

I am looking at an elliptic boundary value problem for an open set $\Omega\subset \mathbb{R}^3$ that is solved over a time interval $(0,T)$ with $T>0$ \begin{equation*} \begin{cases} \begin{aligned}...
Nik's user avatar
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0 answers
56 views

Required number of boundary conditions for a partial differential equation

Consider an ordinary differential equation of order $N$ for a function $u(x)$, of the form $\dot{u} = f\left(u, \frac{du}{dx}, \frac{d^2 u}{dx^2}, ..., \frac{d^N u}{dx^N} \right)$. The number of ...
James's user avatar
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0 answers
45 views

How to justify the way the ghost nodes are applied in Finite Difference Method?

Boundary problem consists of: PDE which is fulfilled for the points inside some domain D, and boundary conditions that apply to the points on the boundary. In other words, the equation describes ...
equator's user avatar
0 votes
0 answers
75 views

Uniqueness of the exterior Neumann problem

I have a question regarding the uniqueness of the exterior Neumann problem, as stated by Lemma 2.4 in this paper. Let $\Omega \subset \mathbb{R}^3$ be a bounded domain with $C^2$ boundary $\partial\...
Fluid's user avatar
  • 71
0 votes
0 answers
38 views

Relations between boundary and inner probabilities for 2D finite state Markov chains

In calculus the Green's theorem relates an integral around a curve to a double integral over the plane region bounded by that curve. Does there exist an analogy of this theorem for 2-dimensional ...
rrv's user avatar
  • 511
5 votes
0 answers
203 views

Reference for Shooting Method

Consider the following setup. We have a second order boundary value problem: $$\dfrac{d^2y}{dx^2}=F(x,y,dy/dx);\qquad y(x_0)=y_0,\quad y(x_f)=y_f.$$ A numerical approach is to almost first write as ...
JP McCarthy's user avatar
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A boundary value problem for differential inclusions

Given a finite family $(\varphi_k)_{1 \le k \le K}$ of smooth scalar functions on $\mathbb{R}^n$ and two points $a, \, b \in \mathbb{R}^n$, I am interested in conditions such that there exists a ...
Hans Engler's user avatar
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Centered-difference left Neumann boundary condition discretization when integrating equation inward

I want to discretize the following nonlinear equation on a domain $[0, R]$: $\frac{dA}{dr} + F(A) = 0$, where $F$ is a nonlinear operator, with the left boundary condition at large finite radius $r = ...
Ghend's user avatar
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0 votes
0 answers
20 views

Variational calculus with constraints of boundary conditions. How to take into account

I am looking for references to understand the following. I've recently solved the thin plate functional minimization subjected to interpolation constraints. The calculations I did are mostly here: ...
user8469759's user avatar
  • 5,387
0 votes
0 answers
71 views

Error in the energy norm for inhomogeneous Dirichlet boundary conditions

Short description When conducting FEM analysis with inhomogeneous Dirichlet boundary conditions, I compute the error in the energy norm with an expression that should only work for problems with ...
Marton's user avatar
  • 1
0 votes
1 answer
53 views

Solution of the parabolic PDE using Green's function

Green's function for the parabolic PDE is defined as: $$\Delta G(\vec{x},t,\vec{\xi},\theta)=\delta(\vec{x}-\vec{\xi},t-\theta)$$ Where $G$ satifies the homogeneous initial and boundary conditions. ...
Krum Kutsarov's user avatar
0 votes
1 answer
37 views

Troubles with solving a Laplace equation

I'm struggling in solving an exercise about the Laplace equation over the domain $[\frac{\pi}{2}, \pi] \times [0, \pi]$ with the boundary conditions: $f(\frac{\pi}{2},y)=f(\pi,y)=f(x,\pi)=0$ and $f(x,...
Osvaldo Paniccia's user avatar
1 vote
0 answers
51 views

Existence of Fokker-Planck equation under Cauchy boundary condition.

A 1D Fokker-Planck equation within a constrain region is uniquely characterized by three functions and a boundary conditon: A drifting term $\mu(x,t)$. A diffusion term $\sigma(x,t)$. An initial ...
陈进泽's user avatar
  • 133
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0 answers
63 views

Solving Dirichlet problem on the unit disc. Is it correct?

I would like to solve the Dirichlet problem in $\Omega = B(i,2)$ and with boundary function $\varphi(x+iy) = x^2y^2$. Attempt I first consider the conformal map $f(z) = \frac{z-i}{2}$, with inverse $f^...
Mths's user avatar
  • 65
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0 answers
113 views

Möbius transformation and Poisson kernel

Let's say $T(x,y)$ measures the temperature in degrees Celsius at points $(x,y)$ of a region $A$: $$A= \{ z \in \mathbb{C}: \text{Re } z> 0 , |z-2| > 1\}$$ If I put some ice at air pressure at ...
Mths's user avatar
  • 65
0 votes
0 answers
19 views

Solvability of the oblique derivative boundary value problem

Let $\Omega$ be a bounded $C^{2,\alpha}$ domain in $\mathbb{R}^n$ that satisfies an interior sphere condition at each point of $\partial \Omega$, i.e., for each $x_0\in \partial \Omega$, there exists ...
Stephen_lamb's user avatar
1 vote
1 answer
75 views

If $f(x) = Ae^{x} + Be^{-x}$ and $f(1) = 0$, then $f(x) = C\sinh(x - 1)$

I need to find a function $f(x)$ of the form $$ f(x) = Ae^{x} + Be^{-x} \;\; A,B \in \mathbb{R} $$ with $f(1) = 0$ The professor immediately concluded that $$ f(x) = C \sinh(1-x) \;\;\; C \in \mathbb{...
Tomer's user avatar
  • 446
2 votes
1 answer
154 views

Regularity of weak solution of elliptic equation with nonlinear Neumann boundary

Let $\Omega \subset \mathbb{R}^n$ be bounded smooth domain and $u \in W^{1,2}(\Omega;\mathbb{R}^m)$ be a weak solution to the following equation \begin{align*} &\int_{\Omega} \nabla u \cdot \nabla ...
mnmn1993's user avatar
  • 413
0 votes
0 answers
58 views

How many Boundary and initial conditions are needed for nonlinear coupled PDEs? Is there a theorem?

I would like to solve the following coupled PDEs, and I wonder how many initial and boundary conditions I need. $$ \partial_t z(x,t) + \partial_x (z(x,t) b(x,t))=0 $$ $$ \partial_x (z(x,t) |b_x|^{m-1}...
questionerno8's user avatar
1 vote
1 answer
166 views

Confusion about one initial/boundary value problem for heat equation

This is a follow-up question to this. The referenced question arose while I was trying to solve $$ \begin{cases} u_t = \frac{1}{2} \Delta u, & x \in X, \\ u ( 0, x ) = 1, & x \in X, \\ u ( t, ...
tsnao's user avatar
  • 330
0 votes
1 answer
41 views

Use method of characteristics to solve $u_x(x,y)+u_y(x,y)=(u(x,y))^2$, $u(x,0)=x$

For this, $z=u(x,y)$ So far I have the characteristic equations: \begin{align*} a&=x_t=1&\implies x(s,t)&=t + f(s),\\ b&=y_t=1&\implies y(s,t)&=t + g(s),\\ c&=z_t=z^2&\...
user avatar
1 vote
1 answer
53 views

Separation of variables method with $u(0,x)=5e^{x^2}-e^{-10x^2};x>0$

\begin{cases} x\frac{\partial{u}}{\partial{t}} + \frac{\partial{u}}{\partial{x}}=0 \\ u(0,x)=5e^{x^2}-e^{-10x^2};x>0 \end{cases} Writing $u(x,t)=X(x)U(t)$: \begin{align*} &xX(x)\Big(\frac{10te^...
J P's user avatar
  • 903
0 votes
0 answers
39 views

Difference of boundary conditions between elliptic and parabolic PDEs

For elliptic PDEs we know that the boundary condition no matter Dirichlet, Neumann or mixed, needs to be defined over the whole boundary of the given volume $\partial V$. Only then we will get a ...
Krum Kutsarov's user avatar
0 votes
1 answer
35 views

Compatibility of Initial/Boundary Conditions in a Convection-Diffusion Problem?

So, I'm reading a book that numerically solves the following convection-diffusion problem $$\dfrac{\partial u}{\partial t} + c\dfrac{\partial u}{\partial x} = \alpha\dfrac{\partial^2 u}{\partial x^2} \...
gettingmathy's user avatar
1 vote
0 answers
75 views

How do we rigorously eliminate $r^n$ and $\log r$ terms in a Fourier series (solving the polar Laplace equation) which is bounded at infinity?

In my PDE module, the general solution to Laplace's equation $\nabla^2 T=0$ in the plane (in polar coordinates) was shown to be $$T(r,\theta)=A_0+B_0\log r+\sum_{n=1}^\infty(A_nr^n+B_nr^{-n})\cos(n\...
Lavender's user avatar
  • 341
1 vote
1 answer
102 views

Monotonicity and uniqueness of solution of boundary value problem [closed]

Consider a function u a solution of the following BVP: $-\frac{d^2u}{dx^2}-c\frac{du}{dx}=f(u) \in (-a,a). u(-a)=1,u(a)=0$, where $f(u)=u-u^2$ so that by comparison principle $0\le u\le1$, my aim is ...
RIM's user avatar
  • 73
2 votes
0 answers
68 views

Laplace equation in-between two non-concentric spheres

We fix two spheres $S_1$ and $S_2$ (without interior) and suppose that $S_2$ is entirely inside $S_1$. For example, $S_1 = \{x^2 + y^2 + z^2 = 25\}$ and $S_2 = \{(x-1)^2 + y^2 + z^2 = 1\}$. How to ...
dnes's user avatar
  • 446
6 votes
2 answers
270 views

The Variational form of a biharmonic PDE

Suppose $\Omega \subset \mathbb{R}^d$ is a $C^{1,1}$ domain. Consider the biharmonic boundary value problem (BVP): $$ \begin{cases} \Delta^2 u = f \\ \nabla u \cdot \nu = g \\ u = u_D \end{cases} $$ ...
Mr. Proof's user avatar
  • 1,682
0 votes
0 answers
29 views

Can separation of variable be used for mixed boundary conditions where boundary conditions are dependent on one another?

Suppose I have a differential equation: $$\frac{\partial^2 f(x,y)}{\partial x^2}+\frac{1}{y}\frac{\partial f(x,y)}{\partial y}+\frac{\partial^2 f(x,y)}{\partial y^2}=0$$ where Boundary condition is: $$...
Userhanu's user avatar
  • 585
0 votes
1 answer
73 views

Help on transformation of boundary conditions

I was working the transformation in this paper A new algorithm for solving classical Blasius equation by Lei Wang The boundary value problem is He used the transformations $$y=f''(\eta),x=f'(\eta)$$ ...
Mohamed Mostafa's user avatar
2 votes
0 answers
33 views

Application of boundary condition finite difference scheme

I am solving a version of the Laplace equation on a square ($a<x<b$, $0<y<h$) grid using finite differences. I have an analytical solution to my problem so I can easily check the ...
Juggler's user avatar
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