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GPT-5.2

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1053 points atgctg | 3 comments | 11 Dec 25 18:04 UTC | HN request time: 0.435s | source
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josalhor ◴[11 Dec 25 18:24 UTC] No.46235005[source]
From GPT 5.1 Thinking:

ARC AGI v2: 17.6% -> 52.9%

SWE Verified: 76.3% -> 80%

That's pretty good!

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verdverm ◴[11 Dec 25 18:28 UTC] No.46235062[source]
We're also in benchmark saturation territory. I heard it speculated that Anthropic emphasizes benchmarks less in their publications because internally they don't care about them nearly as much as making a model that works well on the day-to-day
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HDThoreaun ◴[11 Dec 25 18:56 UTC] No.46235492[source]
Arc-AGI is just an iq test. I don’t see the problem with training it to be good at iq tests because that’s a skill that translates well.
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CamperBob2 ◴[11 Dec 25 19:29 UTC] No.46236017[source]
Exactly. In principle, at least, the only way to overfit to Arc-AGI is to actually be that smart.

Edit: if you disagree, try actually TAKING the Arc-AGI 2 test, then post.

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npinsker ◴[11 Dec 25 19:46 UTC] No.46236205[source]
Completely false. This is like saying being good at chess is equivalent to being smart.

Look no farther than the hodgepodge of independent teams running cheaper models (and no doubt thousands of their own puzzles, many of which surely overlap with the private set) that somehow keep up with SotA, to see how impactful proper practice can be.

The benchmark isn’t particularly strong against gaming, especially with private data.

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mrandish ◴[11 Dec 25 20:53 UTC] No.46236995[source]
ARC-AGI was designed specifically for evaluating deeper reasoning in LLMs, including being resistant to LLMs 'training to the test'. If you read Francois' papers, he's well aware of the challenge and has done valuable work toward this goal.
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1. npinsker ◴[11 Dec 25 20:59 UTC] No.46237068[source]
I agree with you. I agree it's valuable work. I totally disagree with their claim.

A better analogy is: someone who's never taken the AIME might think "there are an infinite number of math problems", but in actuality there are a relatively small, enumerable number of techniques that are used repeatedly on virtually all problems. That's not to take away from the AIME, which is quite difficult -- but not infinite.

Similarly, ARC-AGI is much more bounded than they seem to think. It correlates with intelligence, but doesn't imply it.

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2. keeda ◴[12 Dec 25 00:22 UTC] No.46239338[source]
Maybe I'm misinterpreting your point, but this makes it seem that your standard for "intelligence" is "inventing entirely new techniques"? If so, it's a bit extreme, because to a first approximation, all problem solving is combining and applying existing techniques in novel ways to new situations.

At the point that you are inventing entirely new techniques, you are usually doing groundbreaking work. Even groundbreaking work in one field is often inspired by techniques from other fields. In the limit, discovering truly new techniques often requires discovering new principles of reality to exploit, i.e. research.

As you can imagine, this is very difficult and hence rather uncommon, typically only accomplished by a handful of people in any given discipline, i.e way above the standards of the general population.

I feel like if we are holding AI to those standards, we are talking about not just AGI, but artificial super-intelligence.

3. yovaer ◴[12 Dec 25 00:50 UTC] No.46239562[source]
> but in actuality there are a relatively small, enumerable number of techniques that are used repeatedly on virtually all problems

IMO/AIME problems perhaps, but surely that's too narrow a view for all of mathematics. If solving conjectures were simply a matter of trying a standard range of techniques enough times, then there would be a lot fewer open problems around than what's the case.