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5
votes
Are Berkeley cardinals easier to refute in ZFC than Reinhardt cardinals?
Here is another even simpler refutation. Recall that $δ$ is Berkeley iff for every predicate $A$ and $α≥δ$, there is a nontrivial elementary self-embeding of $(V_α,∈,A)$ with critical point $<δ$. (T …
4
votes
Accepted
1970 question of Reinhardt - how large is this ordinal?
The consistency strength is above that of $n$-iterable cardinals for finite $n$. Thus, despite the seeming weakness of the statement, the $ω$-Erdős upper bound given by Reinhardt is fairly close to t …
5
votes
Classifying set theories whose standard models sharing the same ordinals are equal
For every c.e theory $T$ extending KP (Kripke-Platek) with a model $M$ of height $α<ω_1$, the intersection of all such $M$ is a subset of $L_{α^{+,\mathrm{CK}}}$. This holds since the existence of su …
3
votes
Accepted
On the strength of higher-logic analogues of $\mathsf{ZFC}$ + Montague's Reflection Principle
The first chromatic cardinal is the first Mahlo cardinal. (Per the connection with the reflection in the question, I assume that in the definition, $α$ and the first argument of $c_i$ need not be ina …
3
votes
How would one formulate large cardinals beyond rank into rank?
Rank-into-rank axioms were initially thought to be close to inconsistency, but over time evidence accumulated that in a sense they are just one point in a natural hierarchy of symmetry principles. Ku …
2
votes
What sort of cardinal number is the Löwenheim–Skolem number for second-order logic?
The Löwenheim number (compared to LS, this uses sentences rather than theories) for the second order logic $L^2$ is the least $κ$ such that $V_κ$ satisfies all true $Σ_2$ sentences. This $κ$ has cofi …
6
votes
Accepted
Large cardinals without replacement
Overall, the large cardinal axiom hierarchy is very similar between ZC (ZFC minus replacement; we are including regularity) and ZFC. A large cardinal axiom (unprovable in ZFC) satisfied by $κ$ typica …
2
votes
Accepted
Complexity of a proper class of extendibles
No, it is not; existence of a proper class of extendible cardinals is not provable in ZFC from any consistent $Σ^V_5$ statement.
Assume a proper class of extendibles and let $φ$ be a true $Σ_5$ state …
11
votes
Arguments against large cardinals
Large cardinals offer a detailed coherent picture — with a single principle, that of symmetry, reaching even (essentially) the strongest large cardinals. They continually offer new results — without …
3
votes
Accepted
Strength of BTEE
BTEE is conservative over the stationary reflection principle (SRP), i.e. ZFC + (schema) {there is $n$-subtle cardinal}$_{n∈\mathbb{N}}$. Using $n$-ineffable in the schema is equivalent.
Note that we …
6
votes
Accepted
Consistency of "the sharp of every set exists"
In one sense, closure under sharps is itself a standard point in the hierarchy of consistency strengths. Just like the exact consistency strength of "ZFC + measurable" is "ZFC + measurable", so is the …
4
votes
On independence and large cardinal strength of physical statements
The examples in this thread are interesting as curiosities, but while one never knows where fundamental explorations will lead, we should be skeptical of their physical applicability.
In physics, the …
8
votes
Large cardinal consistency strength and size
Typically, large cardinals with stronger consistency strength are larger, but there is an important general exception:
If a large cardinal axiom is $Σ_{k+1}$, then typically the least example is large …