Describing neutrino oscillations is notoriously tricky. The search for a shortcut led to unexpected places.
By Natalie Wolchover and Quanta, The Atlantic
After breakfast one morning in August, the mathematician Terence Tao opened an email from three physicists he didn’t know. The trio explained that they’d stumbled across a simple formula that, if true, established an unexpected relationship between some of the most basic and important objects in linear algebra.
The formula “looked too good to be true,” says Tao, who is a professor at UCLA, a Fields medalist, and one of the world’s leading mathematicians. “Something this short and simple—it should have been in textbooks already,” he said. “So my first thought was, no, this can’t be true.”
Then he thought about it some more.
The physicists—Stephen Parke of Fermi National Accelerator Laboratory, Xining Zhang of the University of Chicago, and Peter Denton of Brookhaven National Laboratory—had arrived at the mathematical identity about two months earlier while grappling with the strange behavior of particles called neutrinos.
Image: Maciej Rebisz