Lusin's separation theorem

In descriptive set theory and mathematical logic, Lusin's separation theorem states that if A and B are disjoint analytic subsets of Polish space, then there is a Borel set C in the space such that A ⊆ C and B ∩ C = ∅.^[1] It is named after Nikolai Luzin, who proved it in 1927.^[2]

The theorem can be generalized to show that for each sequence (A_n) of disjoint analytic sets there is a sequence (B_n) of disjoint Borel sets such that A_n ⊆ B_n for each n. ^[1]

An immediate consequence is Suslin's theorem, which states that if a set and its complement are both analytic, then the set is Borel.

Notes

References

• Kechris, Alexander (1995), Classical descriptive set theory, Graduate texts in mathematics, 156, Berlin–Heidelberg–New York: Springer-Verlag, pp. xviii+402, doi:10.1007/978-1-4612-4190-4, ISBN 0-387-94374-9, MR 1321597, Zbl 0819.04002  (ISBN 3-540-94374-9 for the European edition)
• Lusin, Nicolas (1927), "Sur les ensembles analytiques" (PDF), Fundamenta Mathematicae (in French), 10: 1–95, JFM 53.0171.05 .