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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Reducing a PDE to a dimensionless form with change of variables

I am working through the following example to refresh my memory on how to use the chain rule when changing variables: Change of variables (PDE) \begin{equation} \begin{split} \frac{\partial{V}}{\partial{t}} + S\frac{\partial{V}}{\partial{S}} +…
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heat equation on a surface

Probably I have not well understood the heat equation: please, can you confirm or correct the followings ? (The question raised in this post is similar to Heat Equation on Manifold but they don't fully overlap , I hope.) Consider an homogeneous,…
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PDE Method of characteristics with initial condition

I wanted to solve the following PDE with initial condition $$ u_t+tu_x=0, $$ $$ u(x,1)=f(x),$$ where $f(x)$ is a given function, using the method of characteristics. I explain what I have done. First of all the characteristic system is $$ x'(\tau)=t…
S. Proa
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Maximum principle and initial conditions (easy)

Can someone tell me why it's true that for $$u_t = a(u)u_{xx} + b(u)u_{x} + c(u)$$ $$u|_{t=0} = u_0$$ if $u_0 > 0$ then the solution $u > 0$ too? Do the functions $a$, $b$, and $c$ need to be constrained in some way for this to hold? There is no…
TagWoh
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What can we say about the number of linearly independent solutions of a PDE

What can we say about the number of linearly independent solutions to a PDE? Firstly, in what function space are we talking about linearity? Secondly, if there is not a general conclusion, what if we restrict the question to a linear PDE?
user136592
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Non-linear transport equation with dissipation (PDE) $u_t + uu_x = -cu$

I am trying to solve the following equation with initial condition: \begin{equation} u_t + uu_x = -cu, \end{equation} $$u(t=0) = v_0(x)$$ In addition to that, I know the solution of equation $u_t + uu_x = 0$, which is $v(x,t)$, with the same initial…
Alej
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Well-posedness of a PDE

I'm trying to check the well-posedness of the following equation: $\pmatrix{u\\v}_t$ = $\pmatrix{4/3 & 0 \\ 1 & 0}$$\pmatrix{u\\v}_{xx}$+$\pmatrix{0 & -2/3 \\ 1 & 0}$$\pmatrix{u\\v}_{xy}$ As far I understand, in order to show well-posedness, I have…
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Problem with $axu_x+byu_y=P(x,y,u)$ type of quasi-linear PDE

I have problem with solving quasi-linear PDE of the form $$axu_x+byu_y=P(x,y,u)$$ where a,b are constans and P is polynomial of $x,y,u.$ I start with writing Lagrange-Charpit equations $$\frac{dx}{ax}=\frac{dy}{by}=\frac{du}{P(x,y,u)}$$ and get one…
Fallen Apart
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First order quasi-linear PDE $zz_x+z_y=1$

Suppose we have a first order quasi-linear PDE $$zz_x+z_y=1$$ and that we want to derive the general solution. First we represent the characteristic curves parametrically as $$x=x(r;s),~y(r;s),~z=z(r;s)$$ where $s$ labels the initial curve. The…
johnny09
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physical meaning of neumann and dirichlet boundary conditions for vibrating string

I have a confusion regarding DIRICHLET and NEUMANN boundary conditions in vibrating string. Is it possible for a vibrating string to have inhomogeneous Dirichlet boundary conditions. As in "partial differential equations" by Walter A. Strauss, It is…
MarF
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Does Log-Lipschitz regularity imply Hölder continuity?

A function is Log-Lipschitz if there exists a constant $C$ such that \begin{equation} |u(x) - u(y)| \le C|x-y| \log|x-y| \end{equation} Is a Log-Lipschitz function $C^{0,\alpha}$ for any $\alpha \in (0,1) $(Hölder continuous)? If you need, assume…
user29999
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what is the solution methods of multidimensional population balance equations?

I want to know, solution methods of multidimensional population balance equations.
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Solve the following partial differential equation

Problem: Let $u(x,y)$ be the solution of the equation $\frac{\partial^2 u}{\partial x^2}+\frac{\partial^2 u}{\partial y^2}=0$, which tends to zero as $y\to \infty$ and has the value $\sin x$ when $y=0$. Then $u=\sum\limits_{n=1}^\infty a_n…
Warrior
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Find three complete integrals of $pq=px + qy$

Solve using charpit auxiliary equations $p=$ partial derivative of $z$ w.r.t. $x$ $q=$ partial derivative of $z$ w.r.t. $y$
vivek
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Existence and uniqueness of weak solution to a PDE system

I'm having trouble trying to deal with the following PDE system: $\Omega$ is an open bounded set in $\mathbb{R}^n$, $\mu \sum_{j=1}^{n}{\partial^2u_{i}/\partial x_{j}^{2}} +(\lambda +\mu) \sum_{j=1}^{n}\partial^{2}u_{j}/\partial x_{i} \partial…
alby
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