A formula for any real number, maybe

Abstract

We discuss how to write down three specific natural numbers A, B, C such that for any real number r you've probably ever thought of, it is consistent with ZFC set theory that RNr = (x0,x1 ∈ ∈fx2 ∈ x3 ∈ ∈fx4 ∈ m ∈ ∈fn0,…,nA ∈ x20 bmatrix +(n0 - 2)2 + (n1-m)2 \\ + n2 + (nB - nC)2 \\ + n3 Σk=04 ( xk - nk+51+n4 +n4)2 \\ + Σi,j = 0B (n9+2i3j - ninj)2 bmatrix ). We also discuss why it's possible, assuming the existence of certain large cardinals, for there to be a real number s which cannot be the value of this formula for our particular A, B, C. This involves set-theoretic mice.