A quadratic estimation for the K\"uhnel conjecture on embeddings

Abstract

The classical Heawood inequality states that if the complete graph Kn on n vertices is embeddable in the sphere with g handles, then g (n-3)(n-4)12. A higher-dimensional analogue of the Heawood inequality is the K\"uhnel conjecture. In a simplified form it states that for every integer k>0 there is ck>0 such that if the union of k-faces of n-simplex embeds into the connected sum of g copies of the Cartesian product Sk× Sk of two k-dimensional spheres, then g ck nk+1. For k>1 only linear estimates were known. We present a quadratic estimate g ck n2. The proof is based on beautiful and fruitful interplay between geometric topology, combinatorics and linear algebra.