Pinned Geometric Configurations in Euclidean Space and Riemannian Manifolds

Let M be a compact d -dimensional Riemannian manifold without a boundary. Given a compact set E ⊂ M , we study the set of distances from the set E to a fixed point x ∈ E . This set is Δ ρ x ( E ) = { ρ ( x , y ) : y ∈ E } , where ρ is the Riemannian metric on M . We prove that if the Hausdorff dimension of E is greater than d + 1 2 , then there exist many x ∈ E such that the Lebesgue measure of Δ ρ x ( E ) is positive. This result was previously established by Peres and Schlag in the Euclidean setting. We give a simple proof of the Peres–Schlag result and generalize it to a wide range of distance type functions. Moreover, we extend our result to the setting of chains studied in our previous work and obtain a pinned estimate in this context.