Homogeneously Suslin set

In descriptive set theory, a set $S$ is said to be homogeneously Suslin if it is the projection of a homogeneous tree. $S$ is said to be $\kappa$ -homogeneously Suslin if it is the projection of a $\kappa$ -homogeneous tree.

If $A\subseteq {}^{\omega }\omega$ is a $\mathbf {\Pi } _{1}^{1}$ set and $\kappa$ is a measurable cardinal, then $A$ is $\kappa$ -homogeneously Suslin. This result is important in the proof that the existence of a measurable cardinal implies that $\mathbf {\Pi } _{1}^{1}$ sets are determined.

References

Martin, Donald A. and John R. Steel (Jan 1989). "A Proof of Projective Determinacy". Journal of the American Mathematical Society. American Mathematical Society. 2 (1): 71–125. doi:10.2307/1990913. JSTOR 1990913.

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Homogeneously Suslin set

See also

References