Inequalities for some operator and matrix functions

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

The function t : (0<:<1) is operator monotone on 0 t< . This is known as the Lo wner Heinz inequality. However, not too many examples of concrete operator monotone functions are known so far. We will systematically seek operator monotone functions which are defined implicitly. This investigation is

We establish some inequalities for the Bessel functions of the first kind J x Ž . Ž . and for the modified Bessel functions I x and K x . Some of these results are obtained using the method of Giordano and Laforgia which is based essentially on the arithmetic᎐geometric mean inequality. Other result

Let 7 be an unknown covariance matrix. Perturbation (in)equalities are derived for various scale-invariant functionals of 7 such as correlations (including partial, multiple and canonical correlations) or angles between eigenspaces. These results show that a particular confidence set for 7 is canoni