The Minimum Number of Points Taking Part in k-Sets in Sets of Unaligned Points

This goes beyond the utterly analytic treatment in the classical (van der Corput’s) theory of exponential sums and vaguely resembles to the situation in [1] (the seminal paper for

Keywords: Billingsley dimension, computability, constructive dimen- sion, fractal geometry, geometric measure theory, iterated function system, Hausdorff dimension, packing

We recently introduced the negentropy increment, a validity index for crisp clustering that quantifies the average normality of the clustering partitions using the negentropy.

For instance, (i) in finite unified theories the universality predicts that the lightest supersymmetric particle is a charged particle, namely the superpartner of the τ -lepton,

Given the much higher efficiencies for solar H 2 -generation from water achieved at tandem PEC/PV devices ( > 10% solar-to-H 2 energy efficiency under simulated sunlight) compared

Let us now advance the main result that we will find: the existence of special points of infinite monodromy around z = ∞ will depend on the structure of the α i : if all the α i

Plotinus draws on Plato’s Symposium (206c4–5) – “procreate in what is beautiful” – 3 in order to affirm that mixed love (which is also a love of beauty) is fecund, although

Lattice points in some special three-dimensional convex bodies with points of Gaussian curvature zero at the boundary.. Lattice points in three-dimensional convex bodies with points