On Erdos Chains in the Plane

Abstract

Let P be a finite point set in R2 with the set of distance n-chains defined as n(P)=\(|p1-p2|,|p2-p3|,…,|pn-pn+1|):pi ∈ P\. We show that for 2≤ n=O|P|(1) we have |n(P)| |P|n132(n-1)|P|. Our argument uses the energy construction of Elekes and a general version of Rudnev's rich-line bound implicit in Rudnev's recent hinge paper which allows one to iterate efficiently on highly intersecting nested subsets of Guth-Katz lines. Let G is a simple connected graph on m=O(1) vertices with m≥ 2. Define the graph-distance set G(P) as G(P) = \ (|pi-pj|)\i,j\∈ E(G) : pi,pj ∈ P\. Combining with results of Guth and Katz and Rudnev with the above, if G has a Hamiltonian path we have |G(P)| |P|m-1polylog|P|. abstract