| Abstract: | In this paper, the isodiametric problem for centrally symmetric convex bodies in the Euclidean d-space
\Bbb Rd{\Bbb R}^d
containing no interior non-zero point of a lattice L is studied. It is shown that the intersection of a suitable ball with the Dirichlet-Voronoi cell of 2L is extremal, i.e., it has minimum diameter among all bodies with the same volume. It is conjectured that these sets are the
only extremal bodies, which is proved for all three dimensional and several prominent lattices. |
