Asymptotics of sharp constants of Markov-Bernstein inequalities in integral norm with Jacobi weight

Abstract

The classical A. Markov inequality establishes a relation between the maximum modulus or the L∞([-1,1]) norm of a polynomial Qn and of its derivative: \|Q'n\|≤slant Mn n2\|Qn\|, where the constant Mn=1 is sharp. The limiting behavior of the sharp constants Mn for this inequality, considered in the space L2([-1,1], w(α,β)) with respect to the classical Jacobi weight w(α,β)(x):=(1-x)α(x+1)β, is studied. We prove that, under the condition |α - β| < 4 , the limit is n ∞ Mn = 1/(2 j) where j is the smallest zero of the Bessel function J(x) and 2 = min(α, β) - 1.