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This answer is a summary of discussions with Dmitry Ryabogin and Ralph Howard. The conclusion is that the original problem is equivalent to other long-standing open problems in convex geometry. OP. L …

This is not really an answer, but a comment on a natural variation of the original problem: assume a convex body in $\mathbb{R}^n$ that is not necessarily centrally symmetric contains only one lattice …

I'm not sure if you are asking for the proof of the theorem assuming Minkowski's inequality or if you are asking for the proof including a proof of Minkowski's inequality. If you assume Minkowski's …

Yes, a version of Minkowski's successive minima studied by Mahler and Weyl consists in letting $\lambda_i'$ to be the radius of the smallest ball containing $i$ linearly independent lattice vectors t …

I think this is true. A proof would go like this: First prove that the body must be an ellipsoid. Without loss of generality you may assume that your body $B$ contains the origin as an interior poin …

I can't say that what I'll relate is fundamental, but it does fit into the new ideas category. Since I and (my collaborator) Florent Balacheff have given talks on the subject and the paper will be in …

These things hold in amazing generality, but you must dig into bit of geometric measure theory, which is the right language for this. Here is the paper that probably started the industry in this dire …

This is an old result in convex geometry. See E. Sas, ¨Uber ein Extremumeigenschaft der Ellipsen, Compositio Math. 6 (1939) 468– 470. A. M. Macbeath, An extremal property of the hypersphere, Proc. C …

I guess it must be in bad taste to answer my own question, but I now know a bit more about this problem and maybe there are other people interested in references to it. As I mentioned in the question …

Dear Igor, Since the answer to your problem is "no" I'm not going to dwell on that, but I feel there is something interesting behind your question that does not admit such a clear cut answer. Two k …