Skip to main content
Search type Search syntax
Tags [tag]
Exact "words here"
Author user:1234
user:me (yours)
Score score:3 (3+)
score:0 (none)
Answers answers:3 (3+)
answers:0 (none)
isaccepted:yes
hasaccepted:no
inquestion:1234
Views views:250
Code code:"if (foo != bar)"
Sections title:apples
body:"apples oranges"
URL url:"*.example.com"
Saves in:saves
Status closed:yes
duplicate:no
migrated:no
wiki:no
Types is:question
is:answer
Exclude -[tag]
-apples
For more details on advanced search visit our help page
Results tagged with
Search options answers only not deleted user 11260

Questions about partial differential equations of elliptic type. Often used in combination with the top-level tag ap.analysis-of-pdes.

5 votes

Reference request: Parabolic Equations

Back in 2012, professor Ben Chow gave some advice to a similar question; these include the Lectures on Elliptic and Parabolic Equations in Sobolev Spaces by Krylov [recommended here by Giorgio Metafu …
Carlo Beenakker's user avatar
4 votes
Accepted

Elliptic PDEs in Finance

For elliptic PDE applications to options these would need be independent of time, they need to be perpetual (i.e. never expire), which is not a typical scenario. If your definition of "mathematical fi …
Carlo Beenakker's user avatar
2 votes

The attractive 'force' between phase interfaces in the Allen-Cahn model

The gradient flow $$\frac{\partial u}{\partial t}=\epsilon^2\Delta u+f(u),\;\;\text{with}\;\;f(u)=u(1-u^2),$$ of the Allen-Cahn functional has no inertia (there is no second order derivative in time), …
Carlo Beenakker's user avatar
11 votes
Accepted

Kernel of the Laplacian + a function

Q: Can we conclude that $Lu=\Delta u+ fu=0$ has only zero (or constant solutions) if we assume $f$ non-constant? A: No, a counter example in one dimension is the Mathieu equation, which has non-consta …
Carlo Beenakker's user avatar
3 votes

Is it true that $\nabla_x \int_0^\infty f(t,0) dt = 0 \implies \nabla_x f(t,0) = 0 \ \forall...

No, the implication in the title is not true, as a simple counterexample, take a factorized $f(t,x)=a(t)b(x)$, with $\int_0^\infty a(t)dt=0$ but $a(t)$ not identically equal to zero and $\nabla_x b(0) …
Carlo Beenakker's user avatar
4 votes

Gauge fixing for a semi-relativistic model involving electromagnetism

You could just try: $A\mapsto A+\nabla \lambda$ leaves the first two equations invariant if I transform $u\mapsto e^{i\lambda}u$ and leave $V$ the same, but then the third equation no longer holds, so …
Carlo Beenakker's user avatar
5 votes
Accepted

Origin of the Liouville theorem for harmonic functions

References to Liouville go back to his 1847 result that a doubly periodic function without poles is identically constant, which does not yet contain the generalization to either harmonic functions or …
Carlo Beenakker's user avatar
2 votes
Accepted

Solving an equation with fractional laplacian

The solution to $$(-\Delta)^s u(x)=1,\;\;-1<x<1, $$ with $u(x)=0$ for $|x|\geq 1$ is $$ u(x)=\frac{\sqrt{\pi}(1-x^2)^s }{4^{s}\Gamma(\tfrac{1}{2}+s)\Gamma(1+s)},$$ as follows from the integral definit …
Carlo Beenakker's user avatar
2 votes
Accepted

name of elliptic pde with a power law nonlinearity

The case $p=2$ is the nonlinear Schrödinger equation, more generally written as $$Eu=-\Delta u+\kappa|u|^2 u,$$ with coefficients $E,\kappa\in\mathbb R$. It describes the propagation of light in nonli …
Carlo Beenakker's user avatar
7 votes

"Overdetermined" Poisson equation

Here is one study Overdetermined elliptic problems in physics. It is proven in $\mathbb{R}^2$ that the Poisson equation $\Delta u=-{\rm constant}$ in $\Omega$, with boundary conditions $u=0$, $\partia …
Carlo Beenakker's user avatar
11 votes
Accepted

Does current follow the path(s) of least (total) resistance?

Perhaps to resolve this issue it helps to work out a simple example. Take a region $D$ consisting of the strip $|x|<1$, $0<y<1$, and a $y$-independent conductivity profile $$\sigma(x)=\begin{cases} 1 …
Carlo Beenakker's user avatar
3 votes

Solving the Poisson equation using a random walk on $\mathbb Z ^d$

Random walk method for the two‐ and three‐dimensional Laplace, Poisson and Helmholtz's equations (paywall) Random Walk Method for Potential Problems (freely accessible) The random walk method is …
Carlo Beenakker's user avatar
13 votes
Accepted

Caccioppoli-Leray Inequality for De Giorgi's theorem proof

I made a trip to the library and scanned the relevant pages from Miranda's 1955 book: page 152-153 and page 154-155 the references are: [3] J. Leray, J.Math. pures et appl. 17, 89-104 (1938) [8] R. Ca …
Carlo Beenakker's user avatar
1 vote

In which way is this a linearization of the Gross-Pitaevskii-Equation?

The linearization intended by Bethuel et al. is around $\tilde{v}=1$, so around $f=0$, $g=0$, so the linearized equation is $0=L_0 \left( \begin{array}{l} f \\\ g \end{array} \right)$ with $L_0 = \le …
Carlo Beenakker's user avatar