Continuing from the question of tiling with mutually non-congruent triangles (and in general, with convex regions) with same area and perimeter, can one think of
packing with mutually non-congruent equal area 2D regions all of which form a one parameter family? For example, packing the plane with ellipses, all of same area but different eccentricity.
Can one say something general: (say) such a packing with mutually noncongruent equal area convex regions belonging to a one parameter family will always be inferior to packing with copies of any one of those regions?
An analogous question can be asked about covering instead of packing.
No comments:
Post a Comment