Suslin cardinal

In mathematics, a cardinal λ < Θ is a Suslin cardinal if there exists a set P ⊂ 2^ω such that P is λ-Suslin but P is not λ'-Suslin for any λ' < λ. It is named after the Russia n mathematician Mikhail Yakovlevich Suslin (1894–1919).^[1]

See also

• Suslin representation
• Suslin line
• AD+

References

• Howard Becker, The restriction of a Borel equivalence relation to a sparse set, Arch. Math. Logic 42, 335–347 (2003), doi:10.1007/s001530200142

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