The result is correct but challenges core norms of mathematics: checking proofs, crediting ideas and keeping research open to ...

A brainy riddle that's stumped mathematicians since World War II appears to have been cracked via artificial intelligence. OpenAI says one of its AI models has solved the "unit distance problem," a ...

The math world is losing its mind over the new solution to an Erdős problem. This is what AI found, how we missed it—and why it matters.

OpenAI claims its reasoning model disproved a geometry conjecture unsolved since 1946 — and this time, the mathematicians who exposed its last embarrassing claim are backing it up.

In mid-May, OpenAI announced that an internal AI model had disproved the Erdős unit distance conjecture, a famous problem in discrete geometry that had stumped human mathematicians for the last 80 ...

Want smarter insights in your inbox? Sign up for our weekly newsletters to get only what matters to enterprise AI, data, and security leaders. Subscribe Now A new artificial intelligence system ...

Equiangular lines are lines in space that pass through a single point, and whose pairwise angles are all equal. Picture in 2D the three diagonals of a regular hexagon, and in 3D, the six lines ...

A chatbot’s result for the 80-year-old “unit distance” conjecture is the first AI proof that would likely be published in math’s top journal if humans had done it alone ...

Add Yahoo as a preferred source to see more of our stories on Google. News about AI math problem raises realization that finding counterexamples can be extremely valuable. getty In today’s column, I ...

OpenAI has said that one of its unreleased AI reasoning models has solved a long-standing mathematics problem first proposed by Paul Erdos in 1946.

Google’s latest milestone comes just days after OpenAI said one of its AI models cracked the famous “planar unit distance problem”, which had been unsolved for the last 80 years.

The following is an excerpt from The Gravity of Math: How Geometry Rules the Universe by Steve Nadis and Shing-Tung Yau. Copyright 2024. Available from Basic Books ...