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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An estimate related to the density argument in Evans PDE Chapter 5 Problem 9

The problem stated in the Evan's book is Integrate by parts to prove:$$\int_U|Du|^p\;dx\le C \left(\int_U|u|^p\;dx\right)^\frac12\left(\int_U|D^2u|^p\;dx\right)^\frac12$$ for $2\le p< \infty$ and all $u\in W^{2,p}(U)\cap W^{1,p}_0(U)$. I have…
Doero
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Solving First Order Wave Equation $\mathrm{\partial_t u(t,x) = -c\cdot \partial_x u(t,x)}$ With Separation

I'm just wondering if you can solve the first order PD wave-equation similar to the second order one by separation. For me however it turns out weird. Having $$\mathrm{\partial_t u(x,t) = -c\cdot \partial_x u(x,t)}$$ one might separate $\mathbf{u}$…
Leon
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Coulomb's law from Maxwell's equations.

I'm trying to find general sufficient additional conditions to derive Coulomb equation for the electric field generated by a steady point charge in free space from Maxwell equations in said conditions. I know that a way to do this is assuming that…
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Partial Differential Equation: Similar to wave equation, with initial velocity as a function of x.

Question: Find all the separated solutions of the given partial differential equation for the initial conditions given in (a) and (b), respectively: $$u_{tt}-u_{xx}-u=0$$ Conditions: $$0
Nero
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Can't figure out this exact differential equation

I have been solving a thermodynamics problem where I have two representations: $(\dfrac{∂v}{∂p})_{θ}$ = $vg(p)e^{-θ}$; $(\dfrac{∂v}{∂θ})_{p}$ = $vp^{2}e^{-θ}$ I want to find $v(p,θ)$, so I am using the fact that $dv$ is an exact differential: $dv =…
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A question on a specific partial differential equation

Let $f(x,y,z,w)$ be a real function with continuous partial derivatives, satisfying the following partial differential equation $$ 2\left(\frac{\partial f}{\partial x}\right)\left(\frac{\partial f}{\partial y}\right) =f\left(\frac{\partial^2…
boaz
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Solving second-order linear hyperbolic PDE already in canonical form

I'm having some problems in finding the general solution of a linear second-order hyperbolic PDE in canonical form $$ u_{xy} = F(u_x, u_y, u, x, y) $$ where $F$ is some function. Specifically I'm interested in solving this PDE in canonical…
pp.ch.te
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Existence of weak solutions of Poisson equations in $\mathbb{R}^{n}$

We consider the Poisson equation $$-\Delta u=f \quad \text{in} \quad\mathbb{R}^{n},$$ where $f\in L^{2}(\mathbb{R}^{n})$. We say $ u\in W_{loc}^{1,2}(\mathbb{R}^{n}) $ is a weak solution of the equation, if $$\int_{\mathbb{R}^{n}}\nabla u\cdot…
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How to make sure that a solution of one differential equation satisfies another in a system of two partial differential equations.

I have general question about system of partial differential equations. Conside a function $\psi = \psi(x,y)$ and a system two partial differential equtions $$ \psi_{xx} + \psi_{x} = F \tag{1} $$ $$ \psi_{yy} + \psi_{y} = G \tag{2} $$ where…
Nitaa a
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Traveling wave solution

Currently I am trying to introduce myself to traveling wave solutions and wave fronts. I came across different definitions. Sometimes traveling wave solutions are expressed as $u(x, t) = U(z)$, where $z = x − ct$ but sometimes $z=x+ct$. What's the…
Stachem
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Weak solution to $-\Delta u+u=f$

I'd like to show that there is a unique solution $u \in H^1_0$ solving \begin{align} -\Delta u+u=f ~~ \text{in} ~~\Omega \\ u=0 ~~~ \text{on} ~~\partial \Omega \end{align} where $\Omega$ is a bounded domain in $\mathbb{R}^n$ and $f \in…
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What is the procedure for finding the strong form of a PDE given a weak form?

The weak form I am given is $$\int_{U} \left(\left(u_{x} - \sin{(x)} u \right)\left(v_{x} - \sin{(x)} v\right)+ u_{y}v_{y}\right) dV = \int_{U} (fv) dV$$ EDIT: Based on the responses below, applying the lemma I get the following: $$\int_{U}…
MrStormy83
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Charpit's method and a nonlinear PDE

I have the nonlinear PDE $$p^2 + 2q = x$$ with the initial condition $u(0, y) = -y^2.$ Here's what I have done so far: I defined the function $F$ to be equal $$F(x, y, p, q, u) = p^2 + 2q - x,$$ and got $$(F_x, F_y, F_p, F_q, F_u) = (-1, 0, 2p, 2,…
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Solving PDE equation

My main problem to solve is anisotropic wood (2D) with tree rings paralel and all in one direction. I'm having problem solving the equation $$au_{xx} + bu_{yy} = -c.$$ It's a non time dependent part of temperature profile in 2D. I've already used…
Bostjan
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elliptic inequality

I'm given the following problem: Let $\Omega=(-1,1)$ and define $\phi(x)=-x^2+\frac{3}{4}$ and \begin{align} K=\lbrace v\in H^1_0(\Omega) | v(x) \geq \phi(x) a.e. x \in \Omega \rbrace \end{align} Consider the problem: Find $u \in K$ such that for…