Multilinear generalized Radon transforms and point configurations

Abstract

We study multilinear generalized Radon transforms using a graph-theoretic paradigm that includes the widely studied linear case. These provide a general mechanism to study Falconer-type problems involving (k+1)-point configurations in geometric measure theory, with k 2, including the distribution of simplices, volumes and angles determined by the points of fractal subsets E ⊂ Rd, d 2. If Tk(E) denotes the set of noncongruent (k+1)-point configurations determined by E, we show that if the Hausdorff dimension of E is greater than d-d-12k, then the k+1 2-dimensional Lebesgue measure of Tk(E) is positive. This compliments previous work on the Falconer conjecture (Erd05 and the references there), as well as work on finite point configurations EHI11,GI10. We also give applications to Erd\"os-type problems in discrete geometry and a fractal regular value theorem, providing a multilinear framework for the results in EIT11.