**Question:** Given a convex polygonal region P, to find the longest connected subset of a circle that can lie entirely in P. 
For some P, the optimal subset will be a full circle; otherwise, a single arc from a circle.

An O(n) algorithm where n is the number of vertices of P would be nice - indeed, an O(n) algorithm is well-known for finding the longest line segment contained in P (its diameter). I don't know if (say) the longest arc that can lie in P (if not a full circle) has at least one of its end points as a vertex of P. 

**Note:** This doc: https://arxiv.org/ftp/arxiv/papers/2005/2005.10245.pdf attempts to find the smallest circular segment containing a given convex polygon. Turning the question inside out (in the spirit of say, https://nandacumar.blogspot.com/2021/03/more-on-oriented-containers-and.html), gives the question of finding the largest area circular segment contained inside the convex polygon. The present question appears closely related. 

**Further question:** Although we don't have a closed formula for the perimeter of an ellipse, it *might* be meaningful to ask for the longest arc of an ellipse contained in a given P.