Difference hierarchy

In set theory, a branch of mathematics, the difference hierarchy over a pointclass is a hierarchy of larger pointclasses generated by taking differences of sets. If Γ is a pointclass, then the set of differences in Γ is ${\displaystyle \{A:\mathrm{\exists }C,D\in \mathrm{\Gamma }(A=C\setminus D)\}}$. In usual notation, this set is denoted by 2-Γ. The next level of the hierarchy is denoted by 3-Γ and consists of differences of three sets: ${\displaystyle \{A:\mathrm{\exists }C,D,E\in \mathrm{\Gamma }(A=C\setminus (D\setminus E))\}}$. This definition can be extended recursively into the transfinite to α-Γ for some ordinal α.^[1]

In the Borel hierarchy, Felix Hausdorff and Kazimierz Kuratowski proved that the countable levels of the difference hierarchy over Π⁰_γ give Δ⁰_γ+1.^[2]

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