Hardy type inequalities in higher dimensions with explicit estimate of constants

Let $\Omega$ be an open set in $\mathbb R^n$ such that $\Omega\ne\mathbb R^n$. For $1\le p<\infty$, $1<s<\infty$ and $\delta=\operatorname{dist}(x,\partial\Omega)$ we estimate the Hardy constant
$$ c_p(s,\Omega)=\sup\{\|f/\delta^{s/p}\|_{L^p(\Omega)}:f\in C_0^\infty(\Omega),\ \|(\nabla f)/\delta^{s/p-1}\|_{L^p(\Omega)}=1\} $$
and some related quantities.
For open sets $\Omega\subset\mathbb R^2$ we prove the following bilateral estimates
$$ \min\{2,p\}M_0(\Omega)\le c_p(2,\Omega)\le 2p(\pi M_0(\Omega)+a_0)^2, \quad a_0=4.38, $$
where $M_0(\Omega)$ is the geometrical parameter defined as the maximum modulus of ring domains in $\Omega$ with center on $\partial\Omega$. Since the condition $M_0 (\Omega)<\infty$ means the uniformly perfectness of $\partial\Omega$, these estimates give a direct proof of the following Ancona–Pommerenke theorem: $c_2(2,\Omega)$ is finite if and only if the boundary set $\partial\Omega$ is uniformly perfect (see [2], [22] and [40]).
Moreover, we obtain the following direct extension of the one dimensional Hardy inequality to the case $n\ge 2$: if $s>n$, then for arbitrary open sets $\Omega\subset\mathbb R^n$ ($\Omega\ne\mathbb R^n$) and any $p\in[1,\infty)$ the sharp inequality $c_p(s,\Omega)\le p/(s-n)$ is valid. This gives a solution of a known problem due to J. L. Lewis [31] and A. Wannebo [44].
Estimates of constants in certain other Hardy and Rellich type inequalities are also considered. In particular, we obtain an improved version of a Hardy type inequality by H. Brezis and M. Marcus [13] for convex domains and give its generalizations.