Simplicial complexes from finite projective planes and colored configurations
Abstract
In the 7-vertex triangulation of the torus, the 14 triangles can be partitioned as T1 T2, such that each Ti represents the lines of a copy of the Fano plane PG(2, F2). We generalize this observation by constructing, for each prime power q, a simplicial complex Xq with q2 + q + 1 vertices and 2(q2 + q + 1) facets consisting of two copies of PG(2, Fq). Our construction works for any colored k-configuration, defined as a k-configuration whose associated bipartite graph G is connected and has a k-edge coloring E(G) [k], such that for all v ∈ V(G), a, b, c ∈ [k], following edges of colors a, b, c, a, b, c from v brings us back to v. We give one-to-one correspondences between (1) Sidon sets of order 2 and size k + 1 in groups with order n, (2) linear codes with radius 1 and index n in the lattice Ak, and (3) colored (k + 1)-configurations with n points and n lines. (The correspondence between (1) and (2) is known.) As a result, we suggest possible topological obstructions to the existence of Sidon sets, and in particular, planar difference sets.
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