A note on the probabilistic approach to Turán's problem

We employ the probabilistic method to prove a stronger version of a result of Helm, related to a conjecture of Erdos and Turan about additive bases of the positive integers. We show that for a class of random sequences of positive integers \(A\), which satisfy \(|A \cap[1, x]| \gg \sqrt{x}\) with pr

We present a probabilistic approach to studying the descent statistic based upon a two-variable probability density. This density is log concave and, in fact, satisfies a higher order concavity condition. From these properties we derive quadratic inequalities for the descent statistic. Using Fourier

We consider problems in the enumeration of sequences suggested by the problem of determining the number of ways of performing a piano composition (Klavierstu ck XI) by Karlheinz Stockhausen.

Let L be a second order elliptic differential operator and let D be an arbitrary open subset of R d . In we introduced a class U 1 (D) of positive solutions of the equation Lu=&u 2 which is in 1 1 correspondence with a convex class H 1 (D) of positive solutions of the equation Lu=0. In the present