Problems analogous to Tibor Radó's conjecture but involving other shapes were considered by Richard Rado starting in late 1940s. A typical setting is a finite family of
convex figures in the
Euclidean space Rd that are
homothetic to a given
X, for example, a square as in the original question, a
disk, or a
d-dimensional
cube. Let : F(X)=\inf_{S}\sup_{I}\frac, where
S ranges over finite families just described, and for a given family
S,
I ranges over all subfamilies that are
independent, i.e. consist of disjoint sets, and bars denote the total volume (or area, in the plane case). Although the exact value of
F(
X) is not known for any two-dimensional convex
X, much work was devoted to establishing upper and lower bounds in various classes of shapes. By considering only families consisting of sets that are parallel and congruent to
X, one similarly defines
f(
X), which turned out to be much easier to study. Thus, R. Rado proved that if
X is a triangle,
f(
X) is exactly 1/6 and if
X is a centrally symmetric
hexagon,
f(
X) is equal to 1/4. In 2008, Sergey Bereg, Adrian Dumitrescu, and Minghui Jiang established new bounds for various
F(
X) and
f(
X) that improve upon earlier results of R. Rado and V. A. Zalgaller. In particular, they proved that : 0.1179 \approx \frac{1}{8.4797} \leq F(\textrm{square}) \leq \frac{1}{4}-\frac{1}{384} \approx 0.2474, and that f(X)\geq\frac{1}{6} for any convex planar
X. == References ==