Description
We study the simultaneous zeros of a random family of $d$ polynomials in $d$ variables over the $p$-adic numbers. For a family of natural models, we obtain an explicit constant for the expected number of zeros that lie in the $d$-fold Cartesian product of the $p$-adic integers. This expected value, which is \[ \left(1 + p^(-1) + p^(-2) + \cdots + p^(-d)\right)^(-1) \] for the simplest model, is independent of the degree of the polynomials.