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Additively_indecomposable_ordinal abstract "In set theory, a branch of mathematics, an additively indecomposable ordinal α is any ordinal number that is not 0 such that for any , we have The set of additively indecomposable ordinals is denoted From the continuity of addition in its right argument, we get that if and α is additively indecomposable, then Obviously , since No finite ordinal other than is in Also, , since the sum of two finite ordinals is still finite. More generally, every infinite cardinal is in is closed and unbounded, so the enumerating function of is normal. In fact, The derivative (which enumerates fixed points of fH) is written Ordinals of this form (that is, fixed points of ) are called epsilon numbers. The number is therefore the first fixed point of the sequence".
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Additively_indecomposable_ordinal wikiPageRevisionID "487285072".
Additively_indecomposable_ordinal hasPhotoCollection Additively_indecomposable_ordinal.
Additively_indecomposable_ordinal id "4056".
Additively_indecomposable_ordinal title "Additively indecomposable".
Additively_indecomposable_ordinal subject Category:Ordinal_numbers.
Additively_indecomposable_ordinal type Abstraction100002137.
Additively_indecomposable_ordinal type DefiniteQuantity113576101.
Additively_indecomposable_ordinal type Measure100033615.
Additively_indecomposable_ordinal type Number113582013.
Additively_indecomposable_ordinal type OrdinalNumber113597280.
Additively_indecomposable_ordinal type OrdinalNumbers.
Additively_indecomposable_ordinal comment "In set theory, a branch of mathematics, an additively indecomposable ordinal α is any ordinal number that is not 0 such that for any , we have The set of additively indecomposable ordinals is denoted From the continuity of addition in its right argument, we get that if and α is additively indecomposable, then Obviously , since No finite ordinal other than is in Also, , since the sum of two finite ordinals is still finite.".
Additively_indecomposable_ordinal label "Additively indecomposable ordinal".
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Additively_indecomposable_ordinal sameAs Q4681349.
Additively_indecomposable_ordinal sameAs Additively_indecomposable_ordinal.
Additively_indecomposable_ordinal wasDerivedFrom Additively_indecomposable_ordinal?oldid=487285072.
Additively_indecomposable_ordinal isPrimaryTopicOf Additively_indecomposable_ordinal.