Questions tagged [partial-differential-equations]

Questions on partial (as opposed to ordinary) differential equations - equations involving partial derivatives of one or more dependent variables with respect to more than one independent variables.

Partial differential equations (PDEs) contain partial derivatives and usually contain two or more variables; the single-variable cases with normal derivatives are ordinary differential equations.

In general partial differential equation can be written in the form $$f(x, y, ,\dots , u, u_x, u_y, \dots , u_{xx}, u_{xy}, \dots )=0$$involving several independent variables $x, y, \dots ,$ an unknown function $u$ of these variables, and the partial derivatives $u_x, u_y, \dots, u_{xx}, u_{xy}, \dots$, of the function.

Subscripts on dependent variables denote differentiations, e.g., $$u_x\equiv \frac{\partial u}{\partial x},\quad u_{xy}\equiv \frac{\partial^2 u}{\partial x \partial y },$$and so on. The $f$ denotes a function defined on a subset of a finite dimensional space. Functional operators on functions like $f(u):=\frac{du}{dx}$ are not allowed in this definition. For instance, Laplace's equation in three dimensions $u_{xx} + u_{yy} + u_{zz} = 0$ is defined by $f(x,y,z,\nabla u,\nabla^2 u) = 0$, where $$f(a,b,c,v,M) := M_{11} + M_{22} + M_{33}.$$

Questions with this tag may be about, among other things:

  1. Analysis of existence and uniqueness of classical/strong/weak/viscous/etc. solutions in boundary value problems/Cauchy problems/Riemann problems.
  2. Functional analysis related to PDEs, e.g., theories of Sobolev spaces, Bochner spaces, analysis of linear/nonlinear differential operators, and pseudodifferential operators, etc.
  3. The stability, or long-term behavior of the solution.
  4. Different methods of solving PDEs, separation of variables, Fourier transform, solitons, method of characteristics.
  5. The solution technique of the Euler-Lagrange equations from calculus of variations.
  6. Equation-relevant theory in other fields, e.g. Hyperbolic conservation laws in fluid/gas dynamics, Maxwell's equations in electromagnetism, Hamilton-Jacobi equation in control theory, etc.

Please consider using more specific tags if your question addresses some of the aspects in that field, e.g., , , , , , , , .

References:

"Partial Differential Equations" by L. C. Evans

" Linear Partial. Differential Equations for Scientists and Engineers" by Tyn Myint-U & Lokenath Debnath

"Differential Equations" by Shepley L. Ross

See also the Wikipedia and MathWorld entries.

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Consequence of strong maximum principle

Let $\Omega \subset \mathbb{R}^N$ be a bounded, connected, open, and regular set. Let $u \in C^\infty(\Omega)$, such that $$u=0, \mbox{ on }\partial \Omega.$$ Let us suppose that as a consequence of an application of the strong maximum principle…
Charlie
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About Heat Equation and Maximum Principle

I can not prove the following problem. In area $\Omega$, we have $v\in C^2(\Omega\times[T,\infty))\bigcup C^1(\partial\Omega\times[T,\infty))$ satisfy the following equation: $$\frac{\partial v}{\partial t}-\Delta v \leq \alpha -v$$ and …
Siqi He
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Homework: Solve the poisson equation in the outer sphere

Our teacher asked us to solve the poisson equation: \begin{eqnarray}\left\{\begin{array}{ccc}\Delta u &= &0 \\ u|_{\partial \overline{B(0,R)}} & = & g \\ \lim_{|\vec{x}|\to\infty} u(\vec{x}) & = & 0\end{array}\right.\end{eqnarray} I tried using the…
Golbez
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Series of complex Fourier coefficients.

I've been trying to figure this out for days now, but I have no idea how to show this. It's from Partial Differential Equations: An Introduction by Walter A. Strauss. Suppose $\int_{-\pi}^{\pi} [ |f(x)|^2 + |g(x)|^2 ] dx $ is finite where $g(x) =…
jlc1112
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Verifying a solution from Strauss' "Partial Differential Equations - An Introduction", 2nd edition

In section 9.2 on page 241, question #12 is given as follows: "Solve the three-dimensional wave equation in $\{r\ne0,t>0\}$ with zero initial conditions and with the limiting condition \begin{equation*} \lim_{r\to 0}4\pi r^{2}u_{r}(r,t) =…
jpb
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PDE oscillation problem

How do I make a start to this question? I am unsure how the given system of equations relate to the pde. Once I know that it would be a trivial to find the eigenvalues and use the given criteria.
MikeMan
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Separating Partial Differential Eq

I have a PDE: $$ \frac{\partial^2\phi(r,\theta)}{\partial r^2} + \frac{1}{r}\frac{\partial\phi(r,\theta)}{\partial r} + \frac{1}{r^2}\frac{\partial^2\phi(r,\theta)}{\partial\theta^2} + C^2\phi(r,\theta)=0 $$ I need to separate the PDE (just…
Jackson Hart
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Canonical form of the PDE $u_{xx}+2u_{xy}+2u_{yz}+u_{zz}=0$

Find the canonical form of the PDE: $$u_{xx}+2u_{xy}+2u_{yz}+u_{zz}=0$$ I know how to do that in the "normal" way: finding the the actual transformation using the eigenvectors of the appropriate matrix. However, I think that there should be…
catch22
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Proprieties of the heat kernel on a bounded domain of $\mathbb{R}^{d}$

I'm interesting to PDE, and I'm asking if the heat kernel with Dirichlet boundary conditions $p_{D}(t,x,y)$ on $[0,1]^{d}$, where $d\geq 1$ satifies i) $\int_{D}p_{D}(t,x,y)dy =1$ or $c_{0} > 0$ ? ii) The chapmann Kolmogorov equation…
user110160
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Show that solution is in $C^{\infty}(\Omega)\cap C(\overline{\Omega})$

Consider $\Omega:=]0,\pi[\times ]0,\infty[$. Use the Fourier method of separation to determine to (formal) bounded solution of the following task: $\Delta u=0$ in $\Omega$ $u(0,y)=u(\pi,y)=0$ for $y\geq 0$ $u(x,0)=g(x)$ fpor $x\in [0,\pi]$, whereat…
user34632
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Prove the estimate $|u(x,t)|\le Ce^{-\gamma t}$

Assume that $\Omega \subset \Bbb R^n$ is an open bounded set with smooth boundary, and $u$ is a smooth solution of \begin{cases} u_t - \Delta u +cu = 0 & \text{in } \Omega \times (0, \infty), \\ u|_{\partial \Omega} = 0, \\ u|_{t=0} =…
Pukki
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A simple question about the domain of a PDE

I would like to understand what the first paragraph after 3 on page 40 is saying, because I want to understand the set up of the first initial-boundary value problem which follows. Suppose if we have just x and t and a 2 dimensional…
Lost1
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First order linear pde with additional partial derivative constraints

Suppose we wish to solve the first order pde for the unknown function $f(x,y)$ $\frac{\partial f}{\partial x}+\frac{\partial f}{\partial y}=c(x,y)\Big(a(x,y)+b(x,y)\Big)$ We assume that the functions $a(x,y)$ and $b(x,y)$ are given, while $c(x,y)$…
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the Sobolev spaces via Fourier tranform

Let $s\in R$ . Consider the classical definition : $$H^{s}(R^n) = \{ f \in S^{'}(R^n) / (1 + \| \theta \|^2)^{s/2} \hat{f} \in L^{2}(R^n) \}.$$ My book says $\widehat{(H^s (R^n))}$" = $L^2({R^n} , (1+|\theta|^2) d \theta)$. The inclusion…
math student
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Show that PDE is uniformly elliptic

Let $\Omega\subset\mathbb{R}^2$ be a bounded domain and $u\in C^2(\Omega)\cap C^1(\overline{\Omega})$. Show, that $$ (1+x^2)w_{xx}-2xw_{xy}+(1+u)w_{yy}-(1+u^2)w_x+(1+u_x)w_y-w=1 $$ is uniformly elliptic. Hello! We defined uniformly…
user34632