Formally, the Hadwiger conjecture is: If K is any bounded convex set in the n-dimensional Euclidean space Rⁿ, then there exists a set of 2ⁿ scalars s_i and a set of 2ⁿ translation vectors v_i such that all s_i lie in the range 0 < s_i < 1, and

${\displaystyle K\subseteq \bigcup _{i=1}^{2^{n}}s_{i}K+v_{i}.}$ 

Furthermore, the upper bound is necessary iff K is a parallelepiped, in which case all 2ⁿ of the scalars may be chosen to be equal to 1/2.

Alternate formulation with illumination edit

As shown by Boltyansky, the problem is equivalent to one of illumination: how many floodlights must be placed outside of an opaque convex body in order to completely illuminate its exterior? For the purposes of this problem, a body is only considered to be illuminated if for each point of the boundary of the body, there is at least one floodlight that is separated from the body by all of the tangent planes intersecting the body on this point; thus, although the faces of a cube may be lit by only two floodlights, the planes tangent to its vertices and edges cause it to need many more lights in order for it to be fully illuminated. For any convex body, the number of floodlights needed to completely illuminate it turns out to equal the number of smaller copies of the body that are needed to cover it.^[1]

As shown in the illustration, a triangle may be covered by three smaller copies of itself, and more generally in any dimension a simplex may be covered by n + 1 copies of itself, scaled by a factor of n/(n + 1). However, covering a square by smaller squares (with parallel sides to the original) requires four smaller squares, as each one can cover only one of the larger square's four corners. In higher dimensions, covering a hypercube or more generally a parallelepiped by smaller homothetic copies of the same shape requires a separate copy for each of the vertices of the original hypercube or parallelepiped; because these shapes have 2ⁿ vertices, 2ⁿ smaller copies are necessary. This number is also sufficient: a cube or parallelepiped may be covered by 2ⁿ copies, scaled by a factor of 1/2. Hadwiger's conjecture is that parallelepipeds are the worst case for this problem, and that any other convex body may be covered by fewer than 2ⁿ smaller copies of itself.^[1]

The two-dimensional case was settled by Levi (1955): every two-dimensional bounded convex set may be covered with four smaller copies of itself, with the fourth copy needed only in the case of parallelograms. However, the conjecture remains open in higher dimensions except for some special cases. The best known asymptotic upper bound on the number of smaller copies needed to cover a given body is^[2]

${\displaystyle \displaystyle 4^{n}\exp \left({\frac {-cn}{\log(n)}}\right)}$ 

where ${\displaystyle c}$  is a positive constant. For small ${\displaystyle n}$  the upper bound of ${\displaystyle (n+1)n^{n-1}-(n-1)(n-2)^{n-1}}$  established by Lassak (1988) is better than the asymptotic one. In three dimensions it is known that 16 copies always suffice, but this is still far from the conjectured bound of 8 copies.^[1]

The conjecture is known to hold for certain special classes of convex bodies, including, in dimension three, centrally symmetric polyhedra and bodies of constant width.^[1] The number of copies needed to cover any zonotope (other than a parallelepiped) is at most ${\displaystyle (3/4)2^{n}}$ , while for bodies with a smooth surface (that is, having a single tangent plane per boundary point), at most ${\displaystyle n+1}$  smaller copies are needed to cover the body, as Levi already proved.^[1]

• Borsuk's conjecture on covering convex bodies with sets of smaller diameter

• Boltjansky, V.; Gohberg, Israel (1985), "11. Hadwiger's Conjecture", Results and Problems in Combinatorial Geometry, Cambridge University Press, pp. 44–46.
• Brass, Peter; Moser, William; Pach, János (2005), "3.3 Levi–Hadwiger Covering Problem and Illumination", Research Problems in Discrete Geometry, Springer-Verlag, pp. 136–142.
• Campos, Marcelo; van Hintum, Peter; Morris, Robert; Tiba, Marius (2023), "Towards Hadwiger's Conjecture via Bourgain Slicing", International Mathematics Research Notices, arXiv:2206.11227, doi:10.1093/imrn/rnad198.
• Gohberg, Israel Ts.; Markus, Alexander S. (1960), "A certain problem about the covering of convex sets with homothetic ones", Izvestiya Moldavskogo Filiala Akademii Nauk SSSR (in Russian), 10 (76): 87–90.
• Hadwiger, Hugo (1957), "Ungelöste Probleme Nr. 20", Elemente der Mathematik, 12: 121.
• Huang, Han; Slomka, Boaz A.; Tkocz, Tomasz; Vritsiou, Beatrice-Helen (2022), "Improved bounds for Hadwiger's covering problem via thin-shell estimates", Journal of the European Mathematical Society, 24 (4): 1431–1448, doi:10.4171/jems/1132, ISSN 1435-9855.
• Lassak, Marek (1988), "Covering the boundary of a convex set by tiles", Proceedings of the American Mathematical Society, 104 (1): 269–272, doi:10.1090/s0002-9939-1988-0958081-7, MR 0958081.
• Levi, Friedrich Wilhelm (1955), "Überdeckung eines Eibereiches durch Parallelverschiebungen seines offenen Kerns", Archiv der Mathematik, 6 (5): 369–370, doi:10.1007/BF01900507, S2CID 121459171.