Abstract:
We will discuss several problems on the loss of heat and
capacities of configurations consisting of $n\ge 3$ balls in
$\mathbb{R}^3$ or $n$ disks in $\mathbb{R}^2$. This study was
initiated by M. L. Glasser and S. G. Davison in 1978, who
considered the so-called “Sleeping armadillos problem”, that is
the problem on the distribution of heat in systems of $n$ balls.
First, we will identify configurations which minimize the
Newtonian capacity or logarithmic capacity under certain
geometrical restrictions. Then, we will prove that the linear
string of balls maximizes the Newtonian capacity among all strings
consisting of $n$ equal balls and that the circular necklace
maximizes the logarithmic capacity over the set of all necklaces
consisting of $n$ equal disks.
Several open questions on the capacities of constellations of
balls in $\mathbb{R}^3$ or disks in $\mathbb{R}^2$ also will be
also discussed.
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