On the ‘Definability of Definable’ Problem of Alfred Tarski

In this paper we prove that for any m ≥ 1 there exists a generic extension of L , the constructible universe, in which it is true that the set of all constructible reals (here subsets of ω ) is equal to the set D 1 m of all reals definable by a parameter free type-theoretic formula with types bounded by m , and hence the Tarski ‘definability of definable’ sentence D 1 m ∈ D 2 m (even in the form D 1 m ∈ D 21 ) holds for this particular m . This solves an old problem of Alfred Tarski (1948). Our methods, based on the almost-disjoint forcing of Jensen and Solovay, are significant modifications and further development of the methods presented in our two previous papers in this Journal.