Let $G(n,p)$ be an Erdős–Rényi graph on $n$ vertices. Is there an explicit expression for the probability $P_{n,p}(u,v)$ that two fixed (distinct) vertices $u,v$ lie in the same connected component of $G(n,p)$?
I'm familiar with the standard asymptotic results about connected components in Erdős–Rényi graphs but was unable to find explicit results for $P_{n,p}$ for finite $n$. I expect these probabilities to be polynomials in $p$ of degree $n(n-1)/2$ but did not succeed in determining the coefficients for general $n$ and $p$.