A Note on Bounds for the Supremum Metric for Discrete Random Variables

## Abstract We clarify the geometric meaning of auxiliary variables that were introduced for covariant quantization of the Brink‐Schwarz superparticle (and the Green‐Schwarz heterotic superstring) by KALLOSH and RAHMANOV (1988).

Manning's expressions for the phenomenological atomic transport coefficients for a random alloy are known from computer simulations to be remarkably accurate for concentrated alloys. These expressions for a binary alloy have been evaluated in the dilute solution limit (i.e. correct to first order in

For an arbitrary polynomial \(P\left(z_{1}, z_{2}, \ldots, z_{n}\right)\) in complex space \(\mathbb{C}^{n}\) we describe a set of nonnegative multi-indices \(\alpha=\left(\alpha_{1}, \alpha_{2}, \ldots, \alpha_{n}\right)\) such that for any \(n\)-tuple \(\delta=\left(\delta_{1}, \delta_{2}, \ldots,