Nonempty interior of configuration sets via microlocal partition optimization

Abstract

We prove new results of Mattila-Sj\"olin type, giving lower bounds on Hausdorff dimensions of thin sets E⊂ Rd ensuring that various k-point configuration sets, generated by elements of E, have nonempty interior. The dimensional thresholds in our previous work GIT20 were dictated by associating to a configuration function a family of generalized Radon transforms, and then optimizing L2-Sobolev estimates for them over all nontrivial bipartite partitions of the k points. In the current work, we extend this by allowing the optimization to be done locally over the configuration's incidence relation, or even microlocally over the conormal bundle of the incidence relation. We use this approach to prove Mattila-Sj\"olin type results for (i) areas of subtriangles determined by quadrilaterals and pentagons in a set E⊂ R2; (ii) pairs of ratios of distances of 4-tuples in Rd; and (iii) similarity classes of triangles in Rd, as well as to (iv) give a short proof of Palsson and Romero Acosta's result on congruence classes of triangles in Rd.