What is the impact of contemporary logic to other field of mathematics?

What is the impact of contemporary logic to other field of mathematics?
Is it useless?

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>What is the impact of contemporary logic to other field of mathematics?
Nothing.

about as much impact as that thot you posted.

People are pretty afraid that maybe some autist will prove some proposition and it's contradiction, makinf ZFC useless and sending formalism to the toilet. But we just have to wait TM

who is this, need sauce

Is this a genuine concern?

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Categorical logic and higher topos theory in particular are the most popular area at the moment among non-logicians.

Not really, as most low level stuff doesn't need ZFC

who is this big-boob thottie

>People are pretty afraid
[citation needed]

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Well, aren't you?

Ciara Horan, more known as Eliza

Mostly in the realm of classification problems. For instance recently (2017), the quandle isomorphism problem was shown to be Borel complete, meaning just as hard as the isomorphism problem for countable groups. The quandle is a complete knot invariant, so this shows that we must less complicated invariants for knots.

>that that hoe over there

post more eliza chan

bump

what if it was a high impact thot?

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Computability theory
Computational complexity
Decidability problems
Type systems (more recently, HoTT)
Automated theorem proving
Proof mining
Topos theory
The general categorical relationship between axiomatizations and their models (one instance being the Curry-Howard correspondence, the relationship between computer programs and mathematical proofs)

All of these are active areas of research

>Well, aren't you?
No.

HIGH SPEED TURBO THOTS