Vopěnka's principle mathematics , Vopěnka's principle is a large cardinal axiom . proper class , some members are similar to others, with this similarity formalized through elementary embeddings.Petr Vopěnka and independently considered by H. Jerome Keisler , and was written up by.apparently unenthusiastic about large cardinals and introduced his principle as a bogus large cardinal property , planning to show later that it was not consistent. However, before publishing his inconsistency proof he found a flaw in it.Definition Vopěnka's principle asserts that for every proper class of binary relations , there is one elementarily embeddable into another. This cannot be stated as a single sentence of ZFC as it involves a quantification over classes. A cardinal κ is called a Vopěnka cardinal if it is inaccessible and Vopěnka's principle holds in the rank V κ .formulations are possible. For every proper class of simple directed graphs , there are two members of the class with a homomorphism between them. For any signature Σ and any proper class of Σ -structures, there are two members of the class with an elementary embedding between them. For every predicate P and proper class S of ordinals , there is a non-trivial elementary embedding j : → for some κ and λ in S . The category of ordinals cannot be fully embedded in the category of graphs . Every subfunctor of an accessible functor is accessible. For every natural number n , there exists a C -extendible cardinal.Strength proper classes definable in first order set theory , the principle implies existence of Σn correct extendible cardinals for every n .almost huge cardinal , then a strong form of Vopěnka's principle holds in V κ :
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