Stability result for the extremal Gr\"unbaum distance between convex bodies

Abstract

In 1963 Gr\"unbaum introduced the following variation of the Banach-Mazur distance for arbitrary convex bodies K, L ⊂ Rn: dG(K, L) = ∈f \ |r| \ : \ K' ⊂ L' ⊂ rK' \ with the infimum taken over all non-degenerate affine images K' and L' of K and L respectively. In 2004 Gordon, Litvak, Meyer and Pajor proved that the maximal possible distance is equal to n, confirming the conjecture of Gr\"unbaum. In 2011 Jim\'enez and Nasz\'odi asked if the equality dG(K, L)=n implies that K or L is a simplex and they proved it under the additional assumption that one of the bodies is smooth or strictly convex. The aim of the paper is to give a stability result for a smooth case of the theorem of Jim\'enez and Nasz\'odi. We prove that for each smooth convex body L there exists 0(L)>0 such that if dG(K, L) ≥ (1-)n for some 0 ≤ ≤ 0(L), then d(K, Sn) ≤ 1 + 40n3r(), where Sn is the simplex in Rn, r() is a specific function of depending on the modulus of the convexity of the polar body of L and d is the usual Banach-Mazur distance. As a consequence, we obtain that for arbitrary convex bodies K, L ⊂ Rn their Banach-Mazur distance is less than n2 - 2-22n-7.