An example of a convex body without symmetric projections.

Many crucial results of the asymptotic theory of symmetric convex bodies were extended to the non-symmetric case in recent years. That led to the conjecture that for everyn-dimensional convex bodyK there exists a projectionP of rankk, proportional ton, such thatPK is almost symmetric. We prove that the conjecture does not hold. More precisely, we construct ann-dimensional convex bodyK such that for everyk >C√nlnn and every projectionP of rankk, the bodyPK is very far from being symmetric. In particular, our example shows that one cannot expect a formal argument extending the “symmetric” theory to the general case. [ABSTRACT FROM AUTHOR]