The complete monotonicity of the Rayleigh function

Let Q, denote the set of all n x n doubly stochastic matrices and let J,, = [l/n],,,. It is conjectured that, for any SE Q,,, the permanent function is monotone increasing on the straight line segment from J, to S, or equivalently that for any 0, 0 < ,9 < 1,

The purpose of this paper is to point out an error in KRISTER SEGERBERG'S proof of the completeness of the modal logic R, and to provide a correct proof.2) The correct proofbased on a notion and a strategy suggested by SEOERBERO'S techniquesintroduces a general approach for obtaining completeness th

Let L L N denote the class of functions defined by ## Ž . Ž . For N ª ϱ we write f g L L. Functions in L L are called completely monotonic on Ž . 0, ϱ . We derive several inequalities involving completely monotonic functions. In particular, we prove that the implication is true for 0 F N F 7, bu

The present knowledge of the monotonicity properties of the spherically averaged electron density p ( r ) and its derivatives, which comes mostly from Roothan-Hartree-Fock calculations, is reviewed and extended to all Hartree-Fock ground-state atoms from hydrogen ( Z = 1) to uranium ( Z = 92). In lo