Landau's Type Inequalities

We give a new definition of the measure of a polynomial. This definition easily leads to a proof of Landau's inequality, \(\mathrm{M}(P) \leq\|P\|\), just using Hadamard's inequality. In the same way, it gives Jensen's formula for polynomials. It also allows us to produce an algorithm to compute the

A connection between Grüss inequality and the error of best approximation is revealed. A Grüss-type inequality that unifies the continuous and discrete versions of the classical Grüss inequalities is established.  2002 Elsevier Science (USA)

Using martingale techniques we will prove several deviation inequalities for diffusion processes in a compact Riemannian manifold and Le vy processes in euclidean space. We also deduce deviation inequalities from Poincare type inequalities in the abstract setting of Dirichlet forms. We thus obtain,

In this paper, we give some improvements of the well-known Aczél inequality and the related results.

In this paper, we establish several inequalities of Hadamard's type for Lipschitzian mappings.

In this paper, some new Hardy-type inequalities involving many functions are obtained. These on the one hand generalize and on the other hand improve some existing results by Isumi and Isumi, Levinson, and Pachpatte on this famous type of inequalities.