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Partial differential equations (PDEs): Existence and uniqueness, regularity, boundary conditions, linear and non-linear operators, stability, soliton theory, integrable PDEs, conservation laws, qualitative dynamics.

5 votes
1 answer
278 views

de Rham theorem for tempered distributions

I am wondering if the following statement holds. If $u\in \mathscr{S}'$ satisfies $\left< u,\Phi\right>=0$ for all $\Phi \in \mathscr{S}$ with $\mathrm{div}\, \Phi=0$, then there exists $p\in \mathsc …
Will Kwon's user avatar
  • 323
2 votes
0 answers
300 views

About definition of NTA domain

I'm not an expert in analysis on very rough domains, such as NTA(Nontangentially Accessible Domain). Here is my question. Usually, NTA domain $\Omega$ is a domain that has inner and outer corkscrew co …
Will Kwon's user avatar
  • 323
3 votes
0 answers
79 views

Reference requests: $W_{p}^1$-estimate for $(\triangle -\lambda)$ on Lipschitz domains

Let $1<p<\infty$ and $\lambda>0$. When $\Omega$ is a bounded $C^1$ or a bounded Lipschitz domain with small Lipschitz constant in $\mathbb{R}^d$, then for every $f\in L_p(\Omega)$ and $\mathbf{F}\in L …
Will Kwon's user avatar
  • 323
1 vote

Does $\int_0^t \Vert u_x(s,\cdot) \Vert_{L^2} ds \le C$ imply $\Vert u_x (t,\cdot) \Vert_{L^...

In the case of linear heat equation, we write $$ u(x,t) = \int_{\mathbb{R}} \Gamma(x-y,t) u_0(y) dy.$$ Here $\Gamma(x,t)$ is the standard heat kernel. Note that $$ \left|\left(\frac{\partial}{\partial …
Will Kwon's user avatar
  • 323
2 votes
1 answer
262 views

Weak-star approximation of smooth functions in weak $L^p$-space

It is well known that the weak space $L^{p,\infty}$ has less density property contrary to standard $L^p$ space. Related to this one, I'm struggling to prove the following statement which is given in t …
Will Kwon's user avatar
  • 323
2 votes
0 answers
106 views

Reference request : Global boundedness of weak solution for Neumann problem

I have some question on global boundedness of weak solution to Neumann problems. Let $u\in W^{1,2}(\Omega)$ is a weak solution for Neumannn problem $$ \mathrm{div} (A \nabla u )= \mathrm{div}\, F\quad …
Will Kwon's user avatar
  • 323
2 votes
0 answers
87 views

Solvability of Neumann boundary problems with singular boundary data $g \in (H^{1})^{*}$

I have a question on the solvability of Neumann boundary problems with singular data. To state my question, let $\Omega$ be a bounded Lipschitz domain (open and connected) in $\mathbb{R}^n$. In the …
Will Kwon's user avatar
  • 323
3 votes
1 answer
447 views

An inequality from Bessel potential space to Besov space

I'm not sure this question is suitable for MathOverflow. Currently, I'm reading a paper "Inhomogeneous Dirichlet Problem in Lipschitz domain" by Jerison and Kenig. I have a question on some inequalit …
Will Kwon's user avatar
  • 323