Quantitative Kr\"oger inequalities for Neumann eigenvalues of convex domains

Abstract

Refining the sharp upper bounds μk,d* obtained by Kr\"oger (1999) for the k-th Neumann eigenvalue of a convex domain ⊂ Rd, we prove the following inequalities: for any k∈ N there exists a constant C(k,d) >0 such that D2 μk() ≤ μk,d* - C(k,d) a2()2/D2 where D is the diameter of and a2() is the second largest semiaxis of the John ellipsoid of . In the planar case, for k=1 we also give an explicit value of the constant C(1,2).