Paradigm that Godel's Theorem of Incompleteness refers to the uncountability of the other set of points on a non-Tarski object.
Ie. the incompleteness Theorem is saying that human beings can count numbers; but mathematics cannot count numbers.
The Baruch-Tarski Theorem declares that each object has twice as many points as it needs to cohere internallistically.
Boolean nihilism states that Godel's incompleteness is referring--not to mathematics' undecidability--but rather to its inability to count Tarski's second set of numbers. More broadly mathematics is unable to count numbers-in general..