Des physiciens créent une nouvelle phase époustouflante de la matière qui agit comme si elle avait deux dimensions temporelles

Les physiciens ont créé une phase remarquable et inédite de la matière dans un ordinateur quantique.

Les physiciens ont démontré un moyen de stocker des informations quantiques moins sujettes aux erreurs en soumettant les qubits d’un ordinateur quantique à des impulsions laser quasi-rythmiques basées sur la séquence de Fibonacci.

Les physiciens ont créé une phase remarquable et inédite de la matière en projetant une séquence d’impulsions laser inspirée de la séquence de Fibonacci sur des atomes à l’intérieur d’un ordinateur quantique. Bien qu’il n’y ait toujours qu’un seul flux de temps singulier, la phase a les avantages de deux dimensions temporelles, ont rapporté les physiciens le 20 juillet dans la revue La nature.

Cette propriété époustouflante offre un avantage hautement souhaitable : les informations stockées dans la phase sont bien mieux protégées contre les erreurs qu’avec les configurations alternatives actuellement utilisées dans les ordinateurs quantiques. En conséquence, les informations peuvent exister beaucoup plus longtemps sans être brouillées, une étape importante pour rendre

 » data-gt-translate-attributes= »[{ » attribute= » »>quantum computing viable, according to study lead author Philipp Dumitrescu.

The approachs innovative use of an extra time dimension is a completely different way of thinking about phases of matter, says Dumitrescu, who worked on the project as a research fellow at the Flatiron Institutes Center for Computational Quantum Physics in New York City. Ive been working on these theory ideas for over five years, and seeing them come actually to be realized in experiments is exciting.

In this quantum computer, physicists created a never-before-seen phase of matter that acts as if time has two dimensions. The phase could help protect quantum information from destruction for far longer than current methods. Credit: Quantinuum

Together with Andrew Potter of the University of British Columbia in Vancouver, Romain Vasseur of the University of Massachusetts, Amherst, and Ajesh Kumar of the University of Texas in Austin, Dumitrescu spearheaded the theoretical component of the research. A team headed by Brian Neyenhuis conducted the experiments on a quantum computer at Quantinuum in Broomfield, Colorado.

Ten atomic ions of the element ytterbium serve as the workhorses of the teams quantum computer. Each ion is individually held and controlled by electric fields produced by an ion trap and can be manipulated or measured using laser pulses.

Each of those atomic ions function as what physicists dub a quantum bit, or qubit. As opposed to conventional computers that quantify information in bits (each representing a 0 or a 1), the qubits used by quantum computers leverage the strangeness of quantum mechanics to store even more information. Just as Schrdingers cat is both dead and alive in its box, a qubit can be a 0, a 1, or a mashup or superposition of both at the same time. That additional information density and the way qubits interact with one another promise to allow quantum computers to solve computational problems far beyond the reach of traditional computers.

The Penrose tiling pattern is a type of quasicrystal, which means that it has an ordered yet never-repeating structure. The pattern, composed of two shapes, is a 2D projection of a 5D square lattice.

However, theres a big problem: Just as peeking in Schrdingers box seals the cats fate, so does interacting with a qubit. And that interaction doesnt even have to be deliberate. Even if you keep all the atoms under tight control, they can lose their quantumness by talking to their environment, heating up or interacting with things in ways you didnt plan, Dumitrescu says. In practice, experimental devices have many sources of error that can degrade coherence after just a few laser pulses.

Therefore, the challenge is to make qubits more robust. To do that, physicists can use symmetries, which are essentially properties that hold up to change. (For example, a snowflake has rotational symmetry because it looks the same when rotated by 60 degrees.) One method is adding time symmetry by blasting the atoms with rhythmic laser pulses. This approach helps, but Dumitrescu and his collaborators wondered if they could go further. So instead of just one time symmetry, they aimed to add two by using ordered but non-repeating laser pulses.

The best way to understand their approach is by considering something else ordered yet non-repeating: quasicrystals. A typical crystal has a regular, repeating structure, like the hexagons in a honeycomb. A quasicrystal still has order, but its patterns never repeat. (Penrose tiling is one example of this.) Even more mind-boggling is that quasicrystals are crystals from higher dimensions projected, or squished down, into lower dimensions. Those higher dimensions can even be beyond physical spaces three dimensions: A 2D Penrose tiling, for instance, is a projected slice of a 5D lattice.

For the qubits, Dumitrescu, Vasseur, and Potter proposed in 2018 the creation of a quasicrystal in time rather than space. Whereas a periodic laser pulse would alternate (A, B, A, B, A, B, etc.), the researchers created a quasi-periodic laser-pulse regimen based on the Fibonacci sequence. In such a sequence, each part of the sequence is the sum of the two previous parts (A, AB, ABA, ABAAB, ABAABABA, etc.). This arrangement, just like a quasicrystal, is ordered without repeating. And, akin to a quasicrystal, its a 2D pattern squashed into a single dimension. That dimensional flattening theoretically results in two time symmetries instead of just one: The system essentially gets a bonus symmetry from a nonexistent extra time dimension.

Actual quantum computers are incredibly complex experimental systems, though, so whether the benefits promised by the theory would endure in real-world qubits remained unproven.

Using Quantinuums quantum computer, the experientialists put the theory to the test. They pulsed laser light at the computers qubits both periodically and using the sequence based on the Fibonacci numbers. The focus was on the qubits at either end of the 10-

Though the findings demonstrate that the new phase of matter can act as long-term quantum information storage, the researchers still need to functionally integrate the phase with the computational side of quantum computing. We have this direct, tantalizing application, but we need to find a way to hook it into the calculations, Dumitrescu says. Thats an open problem were working on.

Reference: Dynamical topological phase realized in a trapped-ion quantum simulator by Philipp T. Dumitrescu, Justin G. Bohnet, John P. Gaebler, Aaron Hankin, David Hayes, Ajesh Kumar, Brian Neyenhuis, Romain Vasseur and Andrew C. Potter, 20 July 2022, Nature.
DOI: 10.1038/s41586-022-04853-4