Asymptotics of the Best Constant in a Certain Markov-Type Inequality

## Abstract We prove an optimal Hardy inequality for the fractional Laplacian on the half‐space. © 2011 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim

## An additive form of the Landau inequality for is proved for 0<c (cos(?Â2n)) &2 , 1 m n&1, with equality for , where T n is the Chebyshev polynomial. From this follows a sharp multiplicative inequality, For these values of \_, the result confirms Karlin's conjecture on the Landau inequality f

We consider families (L t , t # T) of positive linear operators such that each L t is representable in terms of a stochastic process starting at the origin and having nondecreasing paths and integrable stationary increments. For these families, we give probabilistic characterizations of the best pos

We study the asymptotic behavior of the Kobayashi metric near boundary points of the exponentially-flat infinite type in bounded domains in ‫ރ‬ 2 . These depend upon the tangency of the streams of reference points to the boundary. This is a generalization of Graham's theorem on the asymptotic behavi