Extremal graph theory and point configurations in Ahlfors-David regular sets

Abstract

We study the problem of embedding bipartite graphs in Ahlfors-David regular sets of large dimension using results from extremal graph theory. Our main theorem states that any graph satisfying a power-improving bound on the extremal number can be found in the distance graph of a sufficiently high-dimensional AD-regular set. In particular, we show that AD-regular sets of dimension greater than d+12 must contain even cycles of all lengths if d≥ 3, and must contain even cycles of length at least 6 if d=2. This improves the best known threshold for the problem in d≥ 4, and yields entirely new results in d=2,3, under the extra assumption of AD-regularity. We also prove analogous results for large subsets of vector spaces over finite fields, which improve the best known exponent for even cycles in all dimensions.