Inequalities for Composite Functions on a Lattice

It is well-known that, by applying standard inequalities to functions with values in an appropriate Banach space, the applicability of these inequalities can often be usefully extended. For this reason, it is noteworthy that, whereas M. Riesz' original proof of his well-known inequality for the

A set function is a function whose domain is the power set of a set, which is assumed to be finite in this paper. We treat a possibly nonadditive set function, i.e., Ž . Ž . a set function which does not satisfy necessarily additivity, A q B s Ž . AjB for A l B s л, as an element of the linear space

We extend some results of Giroux and Rahman (Trans. Amer. Math. Soc. 193 (1974), 67 98) for Bernstein-type inequalities on the unit circle for polynomials with a prescribed zero at z=1 to those for rational functions. These results improve the Bernstein-type inequalities for rational functions. The

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