Kontsevich conjectured that the number f(G,q) of zeros over the finite field
with q elements of a certain polynomial connected with the spanning trees of a
graph G is polynomial function of q. We have been unable to settle Kontsevich's
conjecture. However, we can evaluate f(G,q) explicitly for certain graphs G,
such as the complete graph. We also point out the connection between
Kontsevich's conjecture and such topics as the Matrix-Tree Theorem and
orthogonal geometry.Comment: 18 pages. This version corrects some minor inaccuracies and adds some
computational information provided by John Stembridg