If you look at this previous problem, I asked how to find the sum of all the areas between two taxicab geometry circles. However, upon learning about $\ell^p$ norms, I thought it would be pretty interesting to extend the problem to all $\ell^p$ norm circles, not just $\ell^1$ (taxicab).
If $p=1$, then the result has already been found (the total area is $\frac{5k^2-k-4}{2}$). If $p = \infty$, then each "circle" is just a square, and the area is also easily found (I'm too tired to think about it, but I think it would just be $4(k^2-1)$). Is there, however, a general formula for the area of each circle and the total area of the regions between circles in terms of $k$ and $p$; that is, what is the equation for the area of each overlapping region?
The area of an individual circle, if I did it correctly, is the area of a Lamé curve with $r = p$ and a radius of $k-n$ (see the linked problem), which equals $\displaystyle 4(k-n)^2\frac{(\Gamma(1+\frac{1}{p})^2)}{\Gamma(1+\frac{2}{p})}$. This can be reduced to $\displaystyle 2(k-n)^2 \frac{\Gamma(\frac{1}{p})^2}{p \Gamma(\frac{2}{p})}$ (see equations 41 and 42 here).
Here are some explanatory pictures:
$k=5, p=1$
$k=5, p=2$
$k=5, p=3$