Illumination of convex bodies with many symmetries
Abstract
Let n≥ C for a large universal constant C>0, and let B be a convex body in Rn such that for any (x1,x2,…,xn)∈ B, any choice of signs 1,2,…,n∈\-1,1\ and for any permutation σ on n elements we have (1xσ(1),2xσ(2),…,nxσ(n))∈ B. We show that if B is not a cube then B can be illuminated by strictly less than 2n sources of light. This confirms the Hadwiger--Gohberg--Markus illumination conjecture for unit balls of 1-symmetric norms in Rn for all sufficiently large n.
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