What is the probability that a random integral quadratic form in n variables is isotropic?

Abstract

We show that the density of quadratic forms in n variables over Zp that are isotropic is a rational function in p, where the rational function is independent of p, and we determine this rational function explicitly. As a consequence, for each n, we determine the probability that a random integral quadratic form in n variables is isotropic. In particular, we show that the probability that a random integral quaternary quadratic form is isotropic is ≈ 97.0\%, in the case where the coefficients of the quadratic form are independently and uniformly distributed in the range [-X,X] with X∞. When random integral quaternary quadratic forms are chosen with respect to the Gaussian Orthogonal Ensemble (GOE), the probability of isotropy increases to ≈ 98.3\%.