Hadamard's Inequality forr-Convex Functions

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

Many converses of Jensen's inequality for convex functions can be found in the literature. Here we give matrix versions, with matrix weights, of these inequalities. Some applications to the Hadamard product of matrices are also given. ᮊ 1997

In this paper we consider the class of s-Orlicz convex functions defined on a s-Orlicz convex subset of a real linear space. Some inequalities of Jensen's type for this class of mappings are pointed out.

A generalization is given of the extension of Hadamard's inequality to r-convex functions. A corresponding generalization of the Fink᎐Mond᎐Pecaric inequalities ˇfor r-convex functions is established.