Landau--Kolmogorov inequality revisited

Abstract

The Landau-Kolmogorov problem consists of finding the upper bound Mk for the norm of intermediate derivative |f(k)|, when the bounds |f| M0 and |f(n)| Mn, for the norms of the function and of its higher derivative, are given. Here, we consider the case of a finite interval, and when all the norms are the max-norms. Our interest to that particular case is motivated by the fact that there are good chances to add this case to a short list of Landau--Kolmogorov inequalities where a complete solution exists, i.e., a solution that covers all values of n,k∈ (and, for a finite interval, all values of σ= Mn/M0). The main guideline here is Karlin's conjecture that says that, for all n,k∈ and all σ>0, the maximum of |f(k)| is attained by a certain Chebyshev or Zolotarev spline. So far, it has been proved only for small n 4 with all σ, and for all n with particular σ= σn. Here, we prove Karlin's conjecture in several further subcases: 1) all n,k∈ and all 0 < σ σn 2) all n ∈ , all σ> 0, with k=1,2 3) all σ> 0, with n < 10 and 0 < k < n.