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.

23235 questions
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Solve Quasilinear PDE with Initial Condition

Here is the question I am having trouble with: Consider the quasilinear equation $u(x,t)$, $u_t+uu_x=-\dfrac{1}{2u}$ with the initial condition $u(x,0)=\sin x$: This is what I have so far: Assume $u(x,t)$ is a solution. Consider…
Nev1535
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Solution of a parabolic PDE

I'm reading a paper where the following parabolic PDE is considered: $u_t(x,t)=u_{xx}(x,t)+b(x)u_x(x,t)+\lambda(x)u(x,t)$, with boundary conditions $u_x(0,t)=qu(0,t) \text{ and } u(1,t)=\int_0^1 k(\xi)u(\xi,t)d\xi$ and initial condition…
Amit
  • 305
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Monge-Ampere PDE is hyperbolic ($f(x) < 0$) - General Solution

I have looked around for help and I have read and re-read my book but cannot get anywhere with this. My question: For $u_{xx}\,u_{yy} - u_{xy}^2 = f(x)$, show it is elliptic when $f(x) > 0$ and find a solution if $f(x)= -x^2$. So, I found a method…
nate
  • 2,159
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Symmetry method for 2d heat equation

Suppose we have the pde $$ \frac{\partial p}{\partial t} = \frac{1}{4}\left( \frac{\partial^2 p}{\partial x^2} + \frac{\partial^2 p}{\partial y^2} \right) $$ Assuming a solution of the form, $$ p(x,y,t) = \frac{1}{t}\phi(\xi),…
Danny
  • 533
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inviscid Burgers' Shock Solution using Vanishing Viscosity Method

Ok, lets say I am going to solve the following equation: $u_t + (\frac{u^2}{2})_x = \epsilon u_{xx}$ which connects the end conditions $u_-=1$ and $u_+ = 0$. According to my understanding of the method, the travelling wave is given by the following…
Kbzon
  • 159
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Non-separable linear PDE

I want to motivate the theory of $C_0$-semigroups to someone, and the following question was asked: What is an example of a non-separable linear PDE? Preferably a simple homogeneous one.
JT_NL
  • 14,514
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Existence of first order PDEs?

It seems the follow theorem is classical, but I don't know how to proof it: For $x\in\Omega\subset R^n$, where $\Omega$ is a domain with smooth boundary, consider the system of PDEs: \begin{equation}\label{eq:1} \frac{\partial f(x)}{\partial…
van abel
  • 1,461
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Do there exist nontrivial global solutions of the PDE $ u_x - 2xy^2 u_y = 0 $?

Consider the following PDE, $$ u_x - 2xy^2 u_y = 0 $$ Does there exist a non-trivial solution $u\in \mathcal{C}^1(\mathbb{R}^2,\mathbb{R})$? It is clear that all solutions for $u\in \mathcal{C}^1( \mathbb{R}^2_+,\mathbb{R})$ are given by $u(x,y) =…
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Fourier Integral for signum function.

Define the signum function, $\text{sgn}(x)$, by $$\text{sgn}(x)=\begin{cases} 1, & x>0\\0, & x=0\\-1, & x<0 \end{cases}$$ Establish the identity $$\dfrac{2}{\pi}\int_0^ \infty \dfrac{\sin(xt)}{t}dt=\text{sgn}(x)$$ There is a hint that we can make…
jinha0001
  • 141
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Proof of an inequality in Sobolev space.

I want to show the next inequality: $$\| D^a u D^b v \|_{L^2(\mathbb{R}^n)} \leq C \| u \|_{H^s(R^n)} \| v \|_{H^s(R^n)}$$ (for $s>n/2$) Where $D$ is a differential operator. What I did so far is to write the next stuff: $$\| D^a u D^b v \|_{L^2} =…
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Rittner equation

I would like to know if the Rittner equation : $$\partial_{t}{\varPhi(x,t)=k\partial_{xx}{\varPhi(x,t)}}-\alpha{\partial_{x}{\varPhi(x,t)}-\beta{\varPhi(x,t)}+g(x,t)}$$ can be solved using the Lax pair method or the Fokas method. Thanks
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Why is a set of functions $v(t)$ dense in $L^2$

I was going through the following paper: http://www.emis.de/journals/HOA/AAA/Volume2011/142128.pdf In page 6, immediately after equation (3.15), its written that "functions of the form $v(t)$ are dense in $L^2\,$". I have been looking for proofs…
Sara
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PDE Initial-Boundary value problem question

The problem: The ends of a stretched string are fixed at the origin and at the point, $ x=\pi$ on the horizontal x-axis. The string is initially at rest along the x-axis, and then drops under it's own weight. The veritcal displacement $y(x,t)$…
user179766
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1 answer

Lax Milgram Application

I found the next exercise in a book. I'm stuck at proving the coercivity of the bilinear functional in the variational formulation of the problem. Suppose that $\Omega$ is a regular $\mathcal{C}^1$ bounded open set. Prove the existence and…
Beni Bogosel
  • 23,381
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PDE: Green's function and the method of images

I am stuck on a problem with the method of images. The formulation is rather simple; Solve the for green's function given by $\nabla^2 G = \delta( \underline{x} - \underline{x}_0)$ in the wedge enclosed by the lines $\theta = 0$ and $\theta =…
Daimonie
  • 178