It is a well known fact, that ellipses can be defined as $$\{x\in\mathbb{R}^2\ \ |\ \ \|x-A\|+\|x-B\|-\|B-A\|=e\in\mathbb{R}_0^+;\ A,B\in\mathbb{R}^2\}$$
Question:
has the generalization $$\{x\in\mathbb{R}^2\ \ |\ \ \|x-A\|+\|x-B\|+\|x-C\|-(\|B-A\|+\|C-B\|+\|A-C\|)=e\in\mathbb{R}_0^+;\ A,B,C\in\mathbb{R}^2\}$$ ever been studied and, is the representation of such curves in barycentric coordinates known?
The question is motivated by my quest to generalize planar convex hulls to arbitrary complete graphs.
Calculating the curves could be done with a CAS, but that would not bring about any of its non-trivial properties, which is why I am interested in publications.
