Graphs from quadratic forms and vector spaces over finite fields

Abstract

Let q be an odd prime power, let n 2, and let V⊂neq Fqn be a proper Fq-vector subspace. Given a nonzero quadratic form Q(X,Y)∈ Fqn[X,Y], we consider the graph Γ(Q,V) that naturally arises from the condition Q(X,Y)∈ V. We determine all quadratic forms Q for which Γ(Q,V) is undirected for every V. Besides the case Q(x,y)=XY, studied earlier by the second author, this essentially leads to the forms X2 Y2 and the family Qb(X, Y):=X2+bXY+Y2, b 0. We then study connectedness and clique number for the corresponding graphs. Our results reveal a clear contrast between these cases. The graphs Γ(X2 Y2, V) are well structured, disconnected and their clique number can be as large as \# V. On the other hand, the family Qb seems to yield less structured graphs: the graphs are connected (in fact, of diameter 2) if \# V q3n/4 and, in many cases, their clique number is o(\# V). Our proofs are mainly based on character sums, while requiring a few algebraic and combinatorial ideas. We end the paper with some open problems and remarks, including a short discussion of the complementary case where q is even.