Geometrical sets with forbidden configurations

Abstract

Given finite configurations P1, …, Pn ⊂ Rd, let us denote by mRd(P1, …, Pn) the maximum density a set A ⊂eq Rd can have without containing congruent copies of any Pi. We will initiate the study of this geometrical parameter, called the independence density of the considered configurations, and give several results we believe are interesting. For instance we show that, under suitable size and non-degeneracy conditions, mRd(t1 P1, t2 P2, …, tn Pn) progressively `untangles' and tends to Πi=1n mRd(Pi) as the ratios ti+1/ti between consecutive dilation parameters grow large; this shows an exponential decay on the density when forbidding multiple dilates of a given configuration, and gives a common generalization of theorems by Bourgain and by Bukh in geometric Ramsey theory. We also consider the analogous parameter mSd(P1, …, Pn) on the more complicated framework of sets on the unit sphere Sd, obtaining the corresponding results in this setting.