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Categoricity : ウィキペディア英語版
Morley's categoricity theorem

In model theory, a branch of mathematical logic, a theory is κ-categorical (or categorical in κ) if it has exactly one model of cardinality κ up to isomorphism.
Morley's categoricity theorem is a theorem of which states that if a first-order theory in a countable language is categorical in some uncountable cardinality, then it is categorical in all uncountable cardinalities.
extended Morley's theorem to uncountable languages: if the language has cardinality κ and a theory is categorical in some uncountable cardinal greater than or equal to κ then it is categorical in all cardinalities greater than κ.
==History and motivation==
Oswald Veblen in 1904 defined a theory to be categorical if all of its models are isomorphic. It follows from the definition above and the Löwenheim–Skolem theorem that any first-order theory with a model of infinite cardinality cannot be categorical. One is then immediately led to the more subtle notion of κ-categoricity, which asks: for which cardinals κ is there exactly one model of cardinality κ of the given theory ''T'' up to isomorphism? This is a deep question and significant progress was only made in 1954 when Jerzy Łoś noticed that, at least for complete theories ''T'' over countable languages with at least one infinite model, he could only find three ways for ''T'' to be κ-categorical at some κ:
*''T'' is totally categorical, ''i.e.'' ''T'' is κ-categorical for all infinite cardinals κ.
*''T'' is uncountably categorical, ''i.e.'' ''T'' is κ-categorical if and only if κ is an uncountable cardinal.
*''T'' is countably categorical, ''i.e.'' ''T'' is κ-categorical if and only if κ is a countable cardinal.
In other words, he observed that, in all the cases he could think of, κ-categoricity at any one uncountable cardinal implied κ-categoricity at all other uncountable cardinals. This observation spurred a great amount of research into the 1960s, eventually culminating in Michael Morley's famous result that these are in fact the only possibilities. The theory was subsequently extended and refined by Saharon Shelah in the 1970s and beyond, leading to stability theory and Shelah's more general programme of classification theory.

抄文引用元・出典: フリー百科事典『 ウィキペディア(Wikipedia)
ウィキペディアで「Morley's categoricity theorem」の詳細全文を読む



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