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
3
votes
1 answer

Global approximation theorem in Sobolev space

${\bf Global\ Approximation\ Theorem}$(251 page inEvans's PDE book) : If $U$ is ${\bf bounded}$ in ${\bf R}^n$, then for $u\in W^{k,p}(U)$, there exists $u_n \in C^\infty (U)\cap W^{k,p}(U)$ such that $$u_n \rightarrow u\ in\ W^{k,p}(U)$$ For the…
HK Lee
  • 19,964
3
votes
1 answer

Has the property $\int\Phi =1$ (of the fundamental solution $\Phi$ of the heat equation) a physical interpretation?

For each $t>0$ the fundamental solution of the heat equation is given by $$\Phi(x,t)=\frac{1}{(4\pi t)^{n/2}}\exp\left(-\frac{|x|^2}{4t} \right )$$ and satisfies $$\int_{\mathbb{R}^n}\Phi(x,t)\,dx=1.$$ Is there any physical interpretation for this…
Pedro
  • 18,817
  • 7
  • 65
  • 127
3
votes
0 answers

wave equation $C^2$ solution

If we consider the wave equation on the half line $\mathbb{R}_+$ such that $u_{tt} -u_{xx}=0$ in $\mathbb{R_+}\times(0,\infty)$ $u(x,0)=g(x)$ and $u_t(x,0)=h(x)$ for $x\in \mathbb{R_+}$ $u(0,t)=0$ for $t \in \mathbb{R}_+$ with $g(0)=0$,…
Tomas Jorovic
  • 3,983
  • 3
  • 27
  • 38
3
votes
0 answers

how to prove this function is harmonic (Fritz John 4.1 #5)

The problem is to prove that Kelvin transformation preserves harmonic functions. That is If $u$ is a harmonic function, then $v(x)=|x|^{2-n}u(\frac{x}{|x|^2})$ is harmonic whenever it is defined. I know there is a way to calculate $\Delta v$…
3
votes
1 answer

The form of the Poisson Integral Formula for a Temperature Profile

The question: consider a hole of radius a in a two-dimensional plane. We let the temperature on the hole's boundary be given by $f(\theta)$, where $\theta$ is a polar angle. From the temperature profile $T(r,\theta)$ for $r>a$, find the Poisson…
3
votes
2 answers

How to solve this First Order PDE $xu_x - yu_y + yu = y$?

The PDE is $xu_x-yu_y+yu=y$ . The method of characteristics gives $\dfrac{dx}{x}=-\dfrac{dy}{y}=\dfrac{du}{y-yu}$ Then $x=-c_1y$ and thus $c_1=-\dfrac{x}{y}$ . Then, I did $du=\dfrac{(y-yu)dy}{y}$ to try to solve for the second constant so that I…
Myles
  • 427
  • 5
  • 14
3
votes
0 answers

PDE- Method of Characteristics

I am given the following equation: $ (y+u)u_x + (x+u)u_y =(x+y)u$ , when: $ u(x,2x)=3x$ . and I want to solve it using the method of characteristics. The equations are: $ x_t = y+u , y_t=x+u , u_t = xu+yu$ and I know that I can find the solution…
decarts
  • 73
3
votes
2 answers

Two questions about PDE

I deal with two problems: $\frac{\partial v}{\partial y} - 2t\frac{\partial v}{\partial t} + 3v = e^{3y-t}$, $v(y,0)=e^y$. $\frac{\partial v}{\partial y} - 2t\frac{\partial v}{\partial t}+3v=e^{3y-t}$, $v(0,t)=e^t$. Here is my approach. I found…
3
votes
2 answers

Schrodinger semigroup and conservation laws

Consider a sufficiently fast decaying and smooth function $f\in L^1(\mathbb{R})\cap L^2(\mathbb{R})$ such that $$ \int_{\mathbb{R}} f(x)dx=0. $$ Now consider the Schrodinger semigroup $e^{it\partial_x^2}$, that is, the operator such that…
W2S
  • 632
3
votes
1 answer

Maximum principle and uniqueness

Let $(M,g)$ be a closed, Riemannian manifold of dimension greater than two. Let $u$ a positive solution of the equation $\Delta u - c u = -du^\frac{n+2}{n-2}$, where $\Delta = -div\nabla$ and $c$ and $d$ are positive constants. I've read that a…
3
votes
0 answers

How to correctly classify PDE?

Let's start with a fully non-linear equation of first order $$ F(x,y,z,z_x,z_y) = a(x,y,z,z_x,z_y) \frac{dz}{dx} + b(x,y,z,z_x,z_y) \frac{dz}{dy} - c(x,y,z,z_x,z_y) = 0 $$ To solve such an equation, I employ the methods of characteristics. $$ …
Lödrik
  • 31
3
votes
1 answer

Heat equation with problematic boundary conditions

I'm asked to solve the heat equation $$u_t = \kappa u_{xx}$$ for $t \ge 0$, $0 \le x \le L$, given boundary conditions $$u_x(0,t) = u_x(L,t) = 0$$ and an initial condition $$u(x,0) = f(x) = 100x/L.$$ This seems problematic to me. In particular,…
3
votes
0 answers

Help with a non-linear partial differential equation

I am wondering whether someone can help me with a non-linear PDE: $$\frac{\partial^2\phi}{\partial t^2} = c\frac{\partial^2\phi}{\partial x^2} \left(\frac{\partial\phi}{\partial x} \right)^{n-1}$$ where, $\phi(x,t)$ is a function of $x$ and $t$,…
Newbee
  • 31
3
votes
0 answers

On solving heat equation from ancient time

The problem asks to find all $C^2$ solution for $$u_t-u_{xx}=t-x^2,\quad (t,x)\in \mathbb{R}^2$$ satisfying $$\lim_{|x|+|t|\to \infty}\frac{|u(x,t)|}{|x|^5+|t|^5}=0$$ The typical heat equation with $(t,x)\in [0,\infty)\times \mathbb{R}$ and initial…
Roy Han
  • 911
3
votes
1 answer

Elliptic theory (existence and regularity) for pde of complex functions

I'm aware that this is a rather general question, but I only need some hint to literature. The setup. I'm studying the existence and regularity of weak solutions to linear elliptic pde of the form $$ \begin{cases} Lu=f & \text{in } U \\ u=g &…
mjb
  • 2,096