Initial Ordinal of A Cardinal
Each ordinal has an associated cardinal, its cardinality, obtained by simply forgetting the order. Any well-ordered set having that ordinal as its order type has the same cardinality. The smallest ordinal having a given cardinal as its cardinality is called the initial ordinal of that cardinal. Every finite ordinal (natural number) is initial, but most infinite ordinals are not initial. The axiom of choice is equivalent to the statement that every set can be well-ordered, i.e. that every cardinal has an initial ordinal. In this case, it is traditional to identify the cardinal number with its initial ordinal, and we say that the initial ordinal is a cardinal.
The α-th infinite initial ordinal is written . Its cardinality is written ℵα (the α-th aleph number). For example, the cardinality of ω0 = ω is ℵ0, which is also the cardinality of ω2, ωω, and ε0 (all are countable ordinals). So (assuming the axiom of choice) we identify ωα with ℵα, except that the notation ℵα is used for writing cardinals, and ωα for writing ordinals. This is important because arithmetic on cardinals is different from arithmetic on ordinals, for example ℵα2 = ℵα whereas ωα2 > ωα. Also, ω1 is the smallest uncountable ordinal (to see that it exists, consider the set of equivalence classes of well-orderings of the natural numbers; each such well-ordering defines a countable ordinal, and ω1 is the order type of that set), ω2 is the smallest ordinal whose cardinality is greater than ℵ1, and so on, and ωω is the limit of ωn for natural numbers n (any limit of cardinals is a cardinal, so this limit is indeed the first cardinal after all the ωn).
Infinite initial ordinals are limit ordinals. Using ordinal arithmetic, α < ωβ implies α+ωβ = ωβ, and 1 ≤ α < ωβ implies α·ωβ = ωβ, and 2 ≤ α < ωβ implies αωβ = ωβ. Using the Veblen hierarchy, β ≠ 0 and α < ωβ imply and Γωβ = ωβ. Indeed, one can go far beyond this. So as an ordinal, an infinite initial ordinal is an extremely strong kind of limit.
Read more about this topic: Von Neumann Cardinal Assignment
Famous quotes containing the words initial and/or cardinal:
“For those parents from lower-class and minority communities ... [who] have had minimal experience in negotiating dominant, external institutions or have had negative and hostile contact with social service agencies, their initial approaches to the school are often overwhelming and difficult. Not only does the school feel like an alien environment with incomprehensible norms and structures, but the families often do not feel entitled to make demands or force disagreements.”
—Sara Lawrence Lightfoot (20th century)
“Distrust all those who love you extremely upon a very slight acquaintance, and without any visible reason. Be upon your guard, too, against those who confess, as their weaknesses, all the cardinal virtues.”
—Philip Dormer Stanhope, 4th Earl Chesterfield (1694–1773)