Pinned patterns and density theorems in Rd
Abstract
For integers k≥ 3,d≥ 2, we consider the abundance property of pinned k-point patterns occurring in E⊂eq Rd with positive upper density δ(E). We show that for any fixed k-point pattern V, there is a set E with positive upper density such that E avoids all sufficiently large affine copies of V, with one vertex fixed at any point in E. However, we obtain a positive quantitative result, which states that for any fixed E with positive upper density, there exists a k-point pattern V, such that for any x∈ E, the pinned scaling factor set equation* DxV(E):=\r> 0: ∃ isometry O such that x+r· O(V)⊂eq E\, equation* has upper density ≥ >0, where constant depends on k,d and δ(E).
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