26:[["$","$L45",null,{"lang":"en","title":"Ehrenfeucht–Mostowski theorem","data":[{"id":"Statement","text":"Statement","level":1},{"id":"Applications","text":"Applications","level":1},{"id":"References","text":"References","level":1}]}],["$","article",null,{"style":{"gridArea":"content","container":"content / inline-size","marginTop":"1em"},"children":[["$","div","enwikipediaEhrenfeucht–Mostowski theorem",{"id":"ww-content","dir":"ltr","children":[[["$","$1","0",{"children":[["$undefined",["$","section",null,{"className":"section_wrapper__8dcj4 top-section intro","data-mw-section-id":"0","children":[["$","span",null,{"children":[false,["$","span",null,{"className":"w-content mw-parser-output","dangerouslySetInnerHTML":{"__html":"

In model theory, a field within mathematical logic, the Ehrenfeucht–Mostowski theorem (Ehrenfeucht & Mostowski 1956) gives conditions for the existence of a model with indiscernibles.

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A linearly ordered set X is called a set of indiscernibles of a model if the truth of a statement about elements of X depends only on their order.

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The Ehrenfeucht–Mostowski theorem states that \nif T is a theory with an infinite model, then there is a model of T containing any given linearly ordered set X as a set of indiscernibles.

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The proof uses Ramsey's theorem.

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The Ehrenfeucht–Mostowski is used to construct models with many automorphisms. It is also used in the theory of zero sharp to construct indiscernibles in the constructible universe.

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