We proceed from https://mathoverflow.net/questions/448712/a-claim-on-the-concurrency-of-area-bisectors-of-planar-convex-regions

This question is somewhat broad.

**Background:** 'Mathematical Omnibus' by Fuchs and Tabachnikov, Lecture 11 describes several results on lines that divide the area of a given convex planar region in the ratio t : (1-t) where 0<t<1/2 (area bisectors are those lines when t=1/2). In the same spirit,  

**Question:** What is known about lines that divide the outer boundary (perimeter) of a planar convex region into 2 connected pieces in the ratio t:1-t - the envelope of these dividing lines for a given t, whether these envelopes have cusps, self intersections and so forth? 

**Remarks:** For convex regions with straight portions of the boundary, some of these dividing lines might lie flush with the boundary for small values of t but that need not rule out interesting results. In the light of the answer and comment (from Fedor Petrov) in https://mathoverflow.net/questions/448712/a-claim-on-the-concurrency-of-area-bisectors-of-planar-convex-regions, the situation with perimeter could be very different from area.