# Difference between revisions of "Huge"

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A cardinal $\kappa$ is ''super-$n$-huge'' if it is $n$-huge with target $\lambda$ for arbitrarily large cardinals $\lambda$. | A cardinal $\kappa$ is ''super-$n$-huge'' if it is $n$-huge with target $\lambda$ for arbitrarily large cardinals $\lambda$. | ||

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## Revision as of 08:59, 30 December 2011

A cardinal $\kappa$ is *huge* with target $\lambda$ if there is an elementary embedding $j:V\to M$ with critical point $\kappa$ such that $j(\kappa)=\lambda$ and $M^\lambda\subset M$.

## Contents

## Almost huge

A cardinal $\kappa$ is *almost huge* with target $\lambda$ if there is an elementary embedding $j:V\to M$ with critical point $\kappa$ such that $j(\kappa)=\lambda$ and $M^{\lt\lambda}\subset M$.

## Superhuge

A cardinal $\kappa$ is *superhuge* if it is huge with target $\lambda$ for unboundedly many cardinals $\lambda$.

## n huge

A cardinal $\kappa$ is *$n$-huge* with target $\lambda$ if there is an elementary embedding $j:V\to M$ with critical point $\kappa$ such that $M^{\kappa_n}\subset M$, where $\kappa_0=\kappa$ and $k_{i+1}=j(\kappa_i)$. Thus, the $1$-huge cardinals are precisely the huge cardinals.

## Super n huge

A cardinal $\kappa$ is *super-$n$-huge* if it is $n$-huge with target $\lambda$ for arbitrarily large cardinals $\lambda$.

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