The Landau-Kolmogorov Problem on a Finite Interval in the Taikov Case

Abstract

We solve the pointwise Landau-Kolmogorov problem on the interval I = [-1,1] on finding |f(k)(t)| under constraints \|f\|2 ≤slant δ and \|f(r)\|2≤slant 1, where t∈I and δ > 0 are fixed. For r = 1 and r = 2, we solve the uniform version of the Landau-Kolmogorov problem on the interval I in the Taikov case by proving the Karlin-type conjecture t∈ I|f(k)(t)| = |f(k)(-1)| under above constraints. The proof relies on the analysis of the dependence of the norm of the solution to higher-order Sturm-Liouville equation (-1)ru(2r) + λ u = -λ f with boundary conditions u(s)(-1) = u(s)(1) = 0, s = 0,1,…,r-1, on non-negative parameter λ, where f is some piece-wise polynomial function. Furthermore, we find sharp inequality \|f(k)\|∞ ≤slant A\|f\|2 + B\|f(r)\|2 with the smallest possible constant A > 0 and the smallest possible constant B = B(A) for k ∈ \r-2, r-1\.