Milner–Rado paradox

In set theory, a branch of mathematics, the Milner – Rado paradox, found by Eric Charles Milner and Richard Rado (1965), states that every ordinal number α less than the successor κ⁺ of some cardinal number κ can be written as the union of sets X₁,X₂,... where X_n is of order type at most κⁿ for n a positive integer.

Proof

The proof is by transfinite induction. Let $\alpha$ be a limit ordinal (the induction is trivial for successor ordinals), and for each $\beta<\alpha$ , let $\{X^\beta_n\}_n$ be a partition of $\beta$ satisfying the requirements of the theorem.

Fix an increasing sequence $\{\beta_\gamma\}_{\gamma<\mathrm{cf}\,(\alpha)}$ cofinal in $\alpha$ with $\beta_0=0$ .

Note $\mathrm{cf}\,(\alpha)\le\kappa$ .

Define:

X^\alpha _0 = \{0\};\ \ X^\alpha_{n+1} = \bigcup_\gamma X^{\beta_{\gamma+1}}_n\setminus \beta_\gamma

Observe that:

\bigcup_{n>0}X^\alpha_n = \bigcup _n \bigcup _\gamma X^{\beta_{\gamma+1}}_n\setminus \beta_\gamma = \bigcup_\gamma \bigcup_n X^{\beta_{\gamma+1}}_n\setminus \beta_\gamma = \bigcup_\gamma \beta_{\gamma+1}\setminus \beta_\gamma = \alpha \setminus \beta_0

and so $\bigcup_nX^\alpha_n = \alpha$ .

Let $\mathrm{ot}\,(A)$ be the order type of $A$ . As for the order types, clearly $\mathrm{ot}(X^\alpha_0) = 1 = \kappa^0$ .

Noting that the sets $\beta_{\gamma+1}\setminus\beta_\gamma$ form a consecutive sequence of ordinal intervals, and that each $X^{\beta_{\gamma+1}}_n\setminus\beta_\gamma$ is a tail segment of $X^{\beta_{\gamma+1}}_n$ we get that: