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Real-valued functions of real variable, analytic properties of functions and sequences, limits, continuity, smoothness of these.
5
votes
Should coffee machines be placed at the region's boundary?
The minimizers cannot lie on the boundary. In fact, denote by $E_i \subset E$ the set of all points which are transported to $x_i^*$. Then, $x_i^*$ has to be the center of mass of $E_i$ and, thus, can …
2
votes
Decomposition of non negative Radon measure into $L^1$ and $H^{-1}$ functions
You can find both results in Theorems 2.1 and 2.4 in
Lucio Boccardo, Thierry Gallouët, Luigi Orsina,
Existence and uniqueness of entropy solutions for nonlinear elliptic equations with measure data,
…
1
vote
PDE satisfied by projection of a function onto a subspace
This works (only?) for $p = 2$. Let us denote the solution of the PDE on $\Omega$ by $v$.
Then, the variational formulations of the PDEs are
$$\int_D \nabla u \cdot \nabla z - fz \,\mathrm{d}x = 0 \q …
4
votes
reference needed for sobolev type estimates
You can manipulate the left-hand side to
\begin{equation*}
\lVert (Dv)^2 \rVert_{H^{3k-2}}
=
\lVert D v \rVert_{W^{3k-2,4}}^2
\le
\lVert v \rVert_{W^{3k-1,4}}^2.
\end{equation*}
(Note that what w …
1
vote
Accepted
using the M. Riesz Interpolation Theorem
My answer is for $p \in (2,4)$, the other case should follow similar.
Let $t \in (0,1)$ be given, such that $$\frac1p = \frac{1-t}{2}+\frac{t}{4}.$$
I will go to use the following consequence of Höld …
1
vote
$L_p$ space embedding (reference request)
Edit: This first paragraph is wrong: I think (a) is fine, because $1 \in L^p$ for $p \in [0,\infty]$ and therefore $f \in L^\infty$ implies $f \in L^p$.
But I think, there is an issue with (b) as it …