Quantengeometrie jenseits von Raum und Zeit

Absolut! Hier ist eine Zusammenfassung des Artikels über Quantengeometrie, erklärt für jemanden ohne Vorkenntnisse.

Eine Neue Geometrie für die Physik

Stell dir vor, du versuchst zu verstehen, wie die kleinsten Bausteine des Universums – winzige Teilchen wie Elektronen oder Quarks – miteinander interagieren. Bisher haben Physiker das meist getan, indem sie sich vorstellen, wie diese Teilchen durch den Raum (die drei Dimensionen, die wir kennen: Länge, Breite, Höhe) und die Zeit (die vierte Dimension, die uns vorwärts bewegt) reisen und zusammenstoßen. Dieses Denken hat sich seit Jahrzehnten bewährt, aber es gibt Situationen, zum Beispiel ganz am Anfang des Universums, wo dieser Ansatz an seine Grenzen stößt.

Die Idee hinter der hier beschriebenen Forschung ist, dass die Art und Weise, wie wir uns Raum und Zeit vorstellen, vielleicht gar nicht das Grundlegendste ist. Stattdessen könnte es eine tiefere, abstraktere Struktur geben, aus der Raum und Zeit selbst entstehen. Es ist, als würde man versuchen, ein komplexes Haus zu verstehen, indem man nur seine Fassade betrachtet. Die Physiker suchen nach den Bauplänen – einer Art Quantengeometrie, die das Verhalten von Teilchen beschreibt, aber ohne direkt auf Raum und Zeit zurückzugreifen.

Das Problem mit den alten Methoden: Feynman-Diagramme

Früher, um vorherzusagen, was bei einem Zusammenstoß von Teilchen passiert, haben Physiker wie Richard Feynman eine clevere Methode entwickelt: die Feynman-Diagramme.

• Feynman-Diagramme: Stell dir diese wie kleine Comic-Streifen vor, die zeigen, wie Teilchen sich bewegen, zusammenstoßen und in andere Teilchen zerfallen können. Jede Linie in einem Diagramm repräsentiert ein Teilchen, das durch Raum und Zeit reist. Jeder mögliche Ablauf eines Teilchenzusammenstoßes wird durch ein eigenes Diagramm dargestellt.

🔗 Verbindung: Diese Diagramme führen zu mathematischen Gleichungen, den sogenannten Amplituden, die die Wahrscheinlichkeit eines bestimmten Ausgangs eines Teilchenzusammenstoßes angeben. Wenn man all diese Amplituden zusammenzählt, bekommt man das Ergebnis.

Das Problem ist: Für komplizierte Zusammenstöße gibt es unzählige Feynman-Diagramme. Das Aufzeichnen und Berechnen all dieser Diagramme ist extrem mühsam und zeitraubend. Oftmals stellen Physiker fest, dass sich nach langer Rechenarbeit viele komplizierte Terme wegkürzen und ein sehr einfaches Ergebnis herauskommt. Das ist frustrierend – so viel Aufwand für eine einfache Antwort!

💡 Denk daran wie: Du versuchst, die gesamte Geschichte des Verkehrs in einer Stadt zu verstehen, indem du jeden einzelnen Weg jedes Autos aufzeichnet. Das ist unglaublich viel Arbeit, und am Ende stellst du vielleicht nur fest, dass die meisten Autos zur gleichen Zeit am gleichen Ort ankommen.

Die Suche nach Abkürzungen: Amplituhedron und Oberflächenkunde (Surfaceology)

Seit Jahren suchen Forscher wie Nima Arkani-Hamed nach Wegen, diese Berechnungen zu vereinfachen.

Im Jahr 2013 entdeckten Arkani-Hamed und sein damaliger Student Jaroslav Trnka ein faszinierendes geometrisches Objekt, das sie Amplituhedron nannten.

• Amplituhedron: Dies ist eine Art mathematische Form, deren "Volumen" (der Raum, den sie einnimmt) direkt die Wahrscheinlichkeit eines bestimmten Teilchenzusammenstoßes angibt. Das Geniale daran ist, dass man dieses Volumen berechnen kann, ohne sich die einzelnen Feynman-Diagramme oder den Weg der Teilchen durch Raum und Zeit anzusehen. Man braucht nur die Eigenschaften der Teilchen, die am Anfang und Ende des Zusammenstoßes beteiligt sind.

🔗 Verbindung: Das Amplituhedron ist ein Beispiel dafür, wie Geometrie direkt Ergebnisse liefern kann, die man sonst nur über komplizierte Feynman-Diagramme erhält.

Das Problem beim Amplituhedron war, dass es nur für sehr spezielle, theoretische Teilchen funktionierte, die sogenannte Supersymmetrie besitzen. Das ist eine Art Symmetrie, die reale Teilchen nicht unbedingt haben.

Die neueste Entwicklung ist die Oberflächenkunde (Surfaceology). Diese neue Methode ist sozusagen der nächste Schritt.

• Oberflächenkunde (Surfaceology): Hierbei betrachtet man keine komplexen Raum-Zeit-Diagramme, sondern Kurven auf Oberflächen. Stell dir eine gekrümmte Fläche vor. Man zeichnet verschiedene Kurven darauf, die sich winden und drehen. Diese Kurven sind wie die "Baupläne" für Teilchenzusammenstöße. Indem man die Eigenschaften dieser Kurven analysiert und zählt, wie sie sich verhalten (z.B. ob sie sich links oder rechts drehen), kann man die Amplituden berechnen.

🔗 Verbindung: Oberflächenkunde ist eine Weiterentwicklung der Idee des Amplituhedrons, die aber viel besser auf realistischere Teilchen anwendbar ist. Sie ersetzt die unzähligen Feynman-Diagramme durch eine viel kompaktere Beschreibung durch Kurven auf Oberflächen.

💡 Denk daran wie: Statt jeden einzelnen Schritt auf einem langen Weg zu beschreiben, um zu einem Ziel zu gelangen, schaust du dir nur die Form der Landschaft an (die Oberfläche) und wie sich die Wege darauf schlängeln (die Kurven). Die Struktur der Kurven verrät dir viel über die Reise.

Der große Vorteil der Oberflächenkunde ist, dass sie vielseitiger ist. Sie funktioniert nicht nur für die theoretischen Teilchen mit Supersymmetrie, sondern auch für Teilchen, die den echten Teilchen in unseren Atomkernen ähneln (sogenannte "farbgeladene" Teilchen).

Das Rätsel der "Versteckten Nullen"

Ein weiterer wichtiger Durchbruch, der zu dieser neuen Geometrie geführt hat, ist die Entdeckung von sogenannten "Nullen" in den Amplituden.

• Amplituden (als Brüche): Früher wurden Amplituden oft als Brüche dargestellt, mit einem Zähler und einem Nenner. Wenn der Nenner sehr klein wird, wird die Amplitude (also die Wahrscheinlichkeit) sehr groß. Das sind die sogenannten Singularitäten – wichtige Hinweise auf physikalische Prozesse.

• Versteckte Nullen: Was die Forscherin Carolina Figueiredo entdeckte, waren Fälle, in denen nicht der Nenner klein wurde, sondern der Zähler. Das führt dazu, dass die Amplitude fast Null wird, was bedeutet, dass bestimmte Teilchenzusammenstöße quasi verboten sind – sie sind extrem unwahrscheinlich. Diese "Nullen" sind schwer mit den alten Feynman-Diagrammen zu finden.

🔗 Verbindung: Figueiredo fand heraus, dass drei scheinbar völlig unterschiedliche Arten von Teilchen (Pionen, Gluonen und andere theoretische Teilchen) genau die gleichen "verbotenen" Zusammenstöße hatten. Das war eine riesige Überraschung und deutete auf eine tiefere, gemeinsame Struktur hin.

Diese Entdeckung zeigte, dass die Oberflächenkunde nicht nur für theoretische Teilchen funktioniert, sondern auch die komplexeren Regeln von realen Teilchen wie Pionen und Gluonen widerspiegelt. Die Kurven auf den Oberflächen scheinen ein gemeinsames mathematisches Fundament für all diese unterschiedlichen Teilchentheorien zu sein.

Warum ist das wichtig?

Diese neuen geometrischen Werkzeuge könnten uns helfen, fundamentale Fragen der Physik zu beantworten:

1. Vereinfachung von Berechnungen: Die Oberflächenkunde macht die Berechnung von Teilchenwechselwirkungen viel effizienter. Sie packt eine riesige Menge an Informationen in ein einfacheres geometrisches Format.
2. Quantengravitation: Langfristig hoffen die Physiker, dass diese Art von abstrakter Geometrie uns helfen kann, eine Theorie der Quantengravitation zu entwickeln. Das ist die "heilige Kuh" der theoretischen Physik, eine Theorie, die die Welt der kleinsten Teilchen (Quantenmechanik) mit der Welt der großen Massen und Kräfte wie der Schwerkraft (Allgemeine Relativitätstheorie) vereint. Derzeit haben wir keine solche vereinheitlichte Theorie.
3. Ursprung von Raum und Zeit: Die Oberflächenkunde und ähnliche geometrische Ansätze könnten uns sogar zeigen, wie Raum und Zeit selbst entstanden sind. Wenn die Geometrie unabhängig von Raum und Zeit existiert, dann könnten Raum und Zeit aus dieser Geometrie "aufblühen".

• Quantengravitation: Eine theoretische Beschreibung, die die Gesetze der Quantenmechanik und der Gravitation unter einem Dach vereint. Dies ist nötig, um extreme Situationen wie Schwarze Löcher oder den Urknall zu verstehen.

💡 Denk daran wie: Wenn die jetzige Physik die "Krankheiten" des Universums beschreibt, suchen die Forscher nach der "Genetik", der grundlegenden Bauanleitung, aus der alles entstanden ist.

Obwohl die Oberflächenkunde und das Amplituhedron noch nicht die vollständige Theorie der Quantengravitation liefern, sehen die Forscher darin einen entscheidenden Schritt. Sie sind wie zwei beeindruckende "Marmorstatuen", die auf dem Weg zu einem größeren, noch unentdeckten "Schloss" gefunden wurden. Die Hoffnung ist, dass diese geometrischen Entdeckungen der Schlüssel sind, um die tiefsten Geheimnisse des Universums zu entschlüsseln und unser Verständnis von Realität, Raum und Zeit neu zu definieren.

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Newfound geometrical objects know how real quantum particles will behave, despite being disconnected from space and time. Señor Salme for Quanta Magazine In the fall of 2022, a Princeton University graduate student named Carolina Figueiredo stumbled onto a massive coincidence. She calculated that collisions involving three different types of subatomic particles would all produce the same wreckage. It was like laying a grid over maps of London, Tokyo and New York and seeing that all three cities had train stations at the same coordinates. “They are very different [particle] theories. There’s no reason for them to be connected,” Figueiredo said. The coincidence soon revealed itself to be a conspiracy: The theories describing the three types of particles were, when viewed from the right perspective, essentially one. The conspiracy, Figueiredo and her colleagues realized, stems from the existence of a hidden structure, one that could potentially simplify the complex business of understanding what’s going on at the base level of reality. For nearly two decades, Figueiredo’s doctoral advisor, Nima Arkani-Hamed, has been leading a hunt for a new way of doing physics. Many physicists believe they’ve reached the end of the road when it comes to conceptualizing reality in terms of quantum events that play out in space and time. Such language can’t easily describe the beginning of the universe, for instance, when the space-time fabric likely didn’t exist in its current form. Arkani-Hamed therefore suspects that the usual notion of quantum particles moving and interacting in space-time is an approximation of deeper, more abstract concepts, which, if found, could serve as a better language for talking about quantum gravity and the origin of the universe. A major development came in 2013, when Arkani-Hamed and his student at the time, Jaroslav Trnka, discovered a jewel-like geometric object that forecasts the outcome of certain particle interactions. They called the object the “amplituhedron.” However, the object didn’t apply to the particles of the real world. So Arkani-Hamed and his colleagues sought more such objects that would. Now Figueiredo’s conspiracy is another manifestation of abstract geometric structure that seems to underlie particle physics. “The overall program is inching closer to Nima’s long-term dream of space-time and quantum mechanics emerging from a new set of principles,” said Sebastian Mizera, a physicist who studies amplitudes at the Institute for Advanced Study in Princeton, New Jersey, but was not involved in the recent work. Like the amplituhedron, the new geometrical method, known as “surfaceology,” streamlines quantum physics by sidestepping the traditional approach, which is to track the countless ways particles can move through space-time using “Feynman diagrams.” These depictions of particles’ possible collisions and trajectories translate into complicated equations. With surfaceology, physicists can get the same result more directly. “It provides a natural framework, or a bookkeeping mechanism, to assemble very large numbers of Feynman diagrams,” said Marcus Spradlin, a physicist at Brown University who has been picking up the new tools of surfaceology. “There’s an exponential compactification in information.”

Carolina Figueiredo, a graduate student at Princeton University, noticed a striking coincidence where three species of seemingly unrelated quantum particles act identically. Andrea Kane/Institute for Advanced Study Unlike the amplituhedron, which required exotic particles to provide a balance known as supersymmetry, surfaceology applies to more realistic, nonsupersymmetric particles. “It’s completely agnostic. It couldn’t care less about supersymmetry,” Spradlin said. “For some people, me included, I think that’s really been quite a surprise.” The question now is whether this new, more primitive geometric approach to particle physics will allow theoretical physicists to slip the confines of space and time altogether. “We needed to find some magic, and maybe this is it,” said Jacob Bourjaily, a physicist at Pennsylvania State University. “Whether it’s going to get rid of space-time, I don’t know. But it’s the first time I’ve seen a door.”

The Trouble with Feynman Figueiredo sensed the need for some new magic firsthand during the waning months of the pandemic. She was struggling with a task that has challenged physicists for more than 50 years: predicting what will happen when quantum particles collide. In the late 1940s, it took a yearslong effort by three of the brightest minds of the post-war era — Julian Schwinger, Sin-Itiro Tomonaga and Richard Feynman — to solve the problem for electrically charged particles. Their eventual success would win them a Nobel Prize. Feynman’s scheme was the most visual, so it came to dominate the way physicists think about the quantum world. When two quantum particles come together, anything can happen. They might merge into one, split into many, disappear or any sequence of the above. And what will actually happen is, in some sense, a combination of all these and many other possibilities. Feynman diagrams keep track of what might happen by stringing together lines representing particles’ trajectories through space-time. Each diagram captures one possible sequence of subatomic events and gives an equation for a number, called an “amplitude,” that represents the odds of that sequence taking place. Add up enough amplitudes, physicists believe, and you get stones, buildings, trees and people. “Almost everything in the world is a concatenation of that stuff happening over and over again,” Arkani-Hamed said. “Just good old-fashioned things bouncing off each other.”

There’s a puzzling tension inherent in these amplitudes — one that has vexed generations of quantum physicists going back to Feynman and Schwinger themselves. One might spend hours at a chalkboard sketching Byzantine particle trajectories and evaluating fearsome formulas only to find that terms cancel out and complicated expressions melt away to leave behind extremely simple answers — in a classic example, literally the number 1. “The degree of effort required is tremendous,” Bourjaily said. “And every single time, the prediction you make mocks you with its simplicity.” Figueiredo had been wrestling with the strangeness of the situation when she attended a talk by Arkani-Hamed, a leading theoretical physicist at the IAS who has spent years seeking a new way of getting the answers without Feynman diagrams. She found her way to a series of his lectures on YouTube, in which he showed how — in special cases — one could jump straight to the amplitude of a certain outcome of a particle collision without worrying about how the particles moved through space. Arkani-Hamed’s shortcuts, which involved reverse-engineering answers that satisfy certain fundamental logical requirements, confirmed Figueiredo’s suspicions that alternative methods were out there. “By asking for these very simple things you could just get the answer. That was definitely striking,” she said. She began to regularly make the half-hour walk from Princeton’s campus to the IAS to work with Arkani-Hamed, a force of nature who runs on Diet Coke and an inexhaustible enthusiasm for physics. Arkani-Hamed and his collaborators aspire to bring about a conceptual revolution of the sort that rocked physics in the late 1700s. Joseph-Louis Lagrange didn’t discover any forces or laws of nature, but every physicist knows his name. He showed that you could predict the future without laboriously calculating actions and equal-and-opposite reactions in the style of Isaac Newton. Instead, Lagrange learned to predict the path an object will follow by considering the energies that different paths require and identifying the easiest path. Lagrange’s method, despite seeming like a mere mathematical convenience at the time, loosened the straitjacket of Newton’s mechanistic view of the universe as a sequence of falling dominos. Two centuries later, Lagrange’s approach provided Feynman with a more flexible framework that could accommodate the radical randomness of quantum mechanics. Now many amplitudes researchers hope a reformulation of quantum physics will set the stage for the next physics revolution, a theory of quantum gravity and the origin of space-time.

Nima Arkani-Hamed of the Institute for Advanced Study has spent more than a decade developing a new mathematical language for describing quantum physics that doesn’t directly refer to space, time or quantum mechanics. Maximilien Brice/Julien Marius Ordan A handful of mini-revolutions have already occurred. One came in the mid-2000s, when Ruth Britto, Freddy Cachazo, Bo Feng and Edward Witten discovered the “recursion relations , ” equations that let physicists condense hundreds of pages of Feynman diagrams to mere lines. Around the same time, Arkani-Hamed joined the hunt for a new conceptual perspective on particle physics, after a couple of thought experiments led him to doubt that space and time are truly well-founded physical concepts. Several years later, he and Trnka discovered the amplituhedron. The amplituhedron is a curvy shape whose contours encode the number and orientation of particles involved in an interaction. Its volume gives the amplitude for that interaction to occur. This volume equals the sum of amplitudes of all the Feynman diagrams depicting the various alternative ways the interaction could play out, but in this case you calculate the answer without reference to those spatiotemporal dynamics; all you need is the list of momentums of the particles that exist before and after the interaction.

“However the scattering happens, it’s controlled by this real structure,” said Vijay Balasubramanian, a physicist at the University of Pennsylvania who studies quantum gravity. “You don’t have to talk about space-time.” The surprising discovery brought new people into the search. But the amplituhedron worked only for a theory of particles that came hand in hand with exotic partner particles, a simplifying balance called supersymmetry. (Generally speaking, one quantum “theory” describes one specific set of rules for one specific set of particles. As such, there are many quantum theories, some for real particles and others for fictitious ones.) “You’re a little bit suspicious that maybe the amazing things you’re seeing have nothing to do with the real world,” said Giulio Salvatori, a physicist who would later join the group. In the following years, Arkani-Hamed’s team identified a second type of shape, the “associahedron,” that worked in a similar way. It had flat sides, and its volume gave scattering amplitudes for the particles of a simplified quantum theory, one that’s easier to study. The particles in this theory carry a type of charge called “color” that is also carried by the quarks and gluons in real-world atomic nuclei. (This charge has nothing to do with actual colors, but the mathematics of how charges combine to make color-neutral composite particles resembles how red, green and blue light together make white.) The particles of this theory also lack supersymmetric partners. The associahedron therefore represented a major step toward the real world. But the shape gave only partial answers, producing amplitudes for only the shortest sequences of subatomic events. Sensing a breakthrough was close, Arkani-Hamed recruited Salvatori and Hadleigh Frost at the University of Oxford, young physicists who had been independently advancing the understanding of the associahedron’s strange shapes, along with the mathematicians Pierre-Guy Plamondon and Hugh Thomas. In 2019, the gang started looking for a geometrical route to all of these amplitudes. Then the pandemic hit, and the team left our space-time to work in the digital ether of Zoom. They would emerge two years later with a second revolutionary way of doing quantum physics.

Curves on Surfaces The mystery confronting them was how to get the amplitudes that would usually come from the more intricate space-time trajectories, those with numerous splittings and mergings. In these cases, it wasn’t clear how to calculate an associahedron’s volume. “We couldn’t say exactly what the deep principle was,” Frost said. Arkani-Hamed was in the habit of working with the 1990s television show Twin Peaks running in the background. He found comfort in the show’s enigmatic vibe and played it dozens of times over the months he spent fiddling with assorted shapes and diagrams. “They’re trying to figure out a crazy, weird mystery with all sorts of insane characters, and so am I,” he told me over Zoom one afternoon, surrounded by the digital red drapes of the “Black Lodge,” a setting inside the Twin Peaks universe but outside its standard space-time. After repeatedly hitting dead ends, the researchers took a step back. They returned to the simpler events that they already understood, whose amplitudes came from the volumes of shapes. The shapes could be defined by polynomials — equations from high school math that sum up sequences of terms. But these were special polynomials, the group realized, in that they corresponded to curves twisting and turning on a surface. With that, they had stumbled upon the surfaces at the heart of surfaceology, their new art for predicting particle collisions.

Mark Belan for Quanta Magazine Here’s how it works. Say you need to calculate the odds of two particles colliding and three particles coming out of the wreckage. Start with a single Feynman diagram — any will do — for this five-particle interaction. It shows two particle trajectories coming in and three coming out. Thicken the lines to form a surface, and draw curves across the surface that explore all its junctions. At this point, the calculation leaves space-time behind; no longer do we imagine particles moving along trajectories and colliding. Instead, the curves — which record the structure of the surface — become the main actors. Each curve can be written as a sequence of left and right turns. Enumerating all the different ways of breaking up this sequence into smaller sequences generates a mathematical expression — one of the special polynomials. Using the polynomials for all the curves, along with some experimental data, you can calculate the amplitude for the five-particle interaction. To a layperson, it’s a lot. But to a quantum physicist, it’s child’s play. “It’s a formula you could teach to a fifth grader,” Spradlin said. “You look at the collection of curves and you count various things that can happen to them as they go around each other.” The researchers found that the procedure works for all amplitudes, including the lengthy sequences of events that had stumped them. The splitting and merging of particles in more complicated interactions translate into surfaces with holes for the curves to loop around, but the procedure remains the same. They also saw that the curves correspond to faces of an associahedron, establishing that the associahedron and surfaceology were two reflections of the same math. The secret sauce of surfaceology, though, is that each of the snaking curves on the surface replaces hordes of Feynman diagrams. Spradlin likened it to decimal notation: You could represent the number 7,312 with four digits or with thousands of tick marks. Surfaceology does something similar for amplitudes, representing particle interactions in a way that is more abstract and mysterious, but also far more efficient. “It’s like paleophysics,” Frost said. “But then out of it comes all this stuff.”

The group published the findings in a pair of preprints, totaling 108 pages, in September 2023. They had made a huge leap toward the real world. But they hadn’t quite reached it. The simplified quantum theory of colored particles that they were working with lacks certain bells and whistles that prevent it from describing any real particles. That’s when Figueiredo joined the gang. She would help finally close the gap.

Hidden Zeros It’s no coincidence that two quantum theories — a supersymmetric theory and “trace phi cubed,” as the other is called — were the first to fall to Arkani-Hamed’s geometric efforts. Both have bare-bones amplitudes. The amplitudes take the form of fractions, with a numerator above a denominator. And in these two theories, all the variables — properties like particle momentums — go in the denominator. Amplitudes researchers obsess about denominators, because if you line up your collision just right, the denominator’s value becomes tiny and the overall value of the fraction becomes huge. Big amplitudes mean highly probable subatomic events, the kind that light up particle detectors like Christmas trees. These special events are called singularities, and they are the fingerprints of any quantum theory. (Note that these singularities are unrelated to the singularities thought to sit at the heart of black holes.) Singularities led Arkani-Hamed to the amplituhedron and associahedron in the first place.

But the quantum theories that describe the real particles of our world put variables in the numerator too. Particles such as electrons have a kind of angular momentum called spin, for instance, and terms capturing the effects of spin go up top. Figueiredo figured that the numerator could be the secret to finding the geometric underpinnings of more realistic particle interactions. She set out to look for collisions in which the numerator of the fraction — instead of the denominator — grows very small. The overall value of these amplitudes would approach zero, so they would represent essentially forbidden collisions with slim odds. Such “zeros” are more elusive than singularities. They’re hard to see with Feynman diagrams, and (by definition) almost impossible to observe experimentally. But Figueiredo had learned from Arkani-Hamed’s group how to recast a trace phi cubed amplitude as the volume of an associahedron. So she tweaked the incoming and outgoing particles and looked for collisions that flattened the shape, making its volume vanish.

Figueiredo’s coincidence helped unify three different quantum theories under a new mathematical umbrella. Andrea Kane/Institute for Advanced Study This led her to the zeros of trace phi cubed. Then, on a whim, she checked other theories. She examined the same collisions but using pions — real particles that play by different rules. There’s no known geometric theory for pions, so she had to resort to grinding out the amplitude using Feynman diagrams. The result was striking: The pion theory also outlawed precisely the same collisions. To the wider particle physics community, Figueiredo’s conspiracy came out of the blue. Bourjaily was in the audience when Arkani-Hamed teased the result at a conference last year. He recalls other physicists scratching their heads, wondering if pions could really act so similarly to such radically simpler particles. Bourjaily quickly checked the conspiracy for collisions involving up to 14 particles. Finding that it held, he marveled at how the new scheme reduced recently published predictions to trivial computations. “They were hard-won results that you just got for free,” said Bourjaily, who did his Ph.D. with Arkani-Hamed. “I have no idea why that’s true.”

The conspiracy continued. The same collisions turned out to be illegal under the laws of gluons, known as Yang-Mills theory. What seemed like three completely different theories all shared the same zeros. “There was no reasonable explanation for this,” Figueiredo said. Further exploration turned up the reason: The curves of trace phi cubed theory give an equation for an amplitude. The zeros make this amplitude very rigid; there’s only one part of the equation you can modify and still preserve the zeros, Figueiredo and collaborators found. Tweaking it in one way gave you pions. Another gives you gluons. They realized that all three theories come from curves on surfaces in essentially the same way. Figueiredo and Arkani-Hamed, along with their collaborators Qu Cao, Jin Dong, and Song He, posted their findings last winter. “We’re learning things about real-world processes that we didn’t know before. Like the fact that phi cubed [particles], pions, and gluons are … so closely related,” Arkani-Hamed said.

Twists and Turns Other groups have since made further advances. Initially, the surfaceology scheme applied only to collisions between bosons, particles with integer amounts of spin. But many of the matter particles that make up our world, such as electrons, are fermions, which have half-integer amounts of spin. A group at Brown led by Spradlin, Anastasia Volovich and Marcos Skowronek has made progress in extending surfaceology to new particles. The group worked out a new set of rules for curves that can accommodate certain toy fermions.

From left: Brown University researchers Anastasia Volovich, Marcos Skowronek and Marcus Spradlin extended surfaceology to cover a new family of particles. Courtesy of Anastasia Volovich/LORES When Shruti Paranjape, a physicist then at the University of California, Davis, saw a slide at a conference last December that listed which quantum theories shared “hidden” zeros, she felt a flash of recognition. They were all theories in which it was possible to combine two copies of amplitudes of one theory to make an amplitude of another theory — a somewhat mysterious operation known as the double copy. She and her collaborators showed that if one could double copy a theory, then that theory would have the zeros Figueiredo had found. It’s another hint that more theories might be brought into the geometric fold. The original surfaceology group is following up on indications that their curves know about much more than just amplitudes for colored particles. The typical procedure is to draw only curves that don’t cross themselves. But if you include the self-intersecting curves, the researchers noticed, you get a strange-looking amplitude, which turns out not to describe collisions between particles but rather tangled interactions between longer objects known as strings. Thus, surfaceology appears to be another route to string theory, a candidate theory of quantum gravity that posits that quantum particles are made of vibrating strings of energy. “This formalism, as far as we can tell, contains string theory but allows you to do more things,” Arkani-Hamed said.

As a postdoc at the University of California, Davis, Shruti Paranjape connected a pattern in particle behavior revealed by surfaceology with the enigmatic “double copy” phenomenon. Ashish Kakkar Surfaceology might also account for gravitons, the particles thought to impart the gravitational force. While working out how much each curve would contribute to a trace phi cubed amplitude, the group came across curves that were unavoidable but that didn’t change the final answer. If the surface had holes, these curves circled around the holes forever, never taking an exit. From the space-time perspective, these curves capture events beyond the purview of trace phi cubed theory: colorless particles that the researchers believe could eventually describe gravitons. That would be a crucial step toward Arkani-Hamed’s ultimate aspiration of developing a novel theoretical framework for quantum gravity. “We don’t yet have a complete working picture of something gravitational,” Arkani-Hamed said. “But there are more and more hints that gravity is going to come along.”

Physics for a New Era There’s more to quantum gravity than gravitons, which would represent just the mildest ripples in space-time. A full theory would need to go beyond ripples to describe what happens when stars collapse and form black holes, warping the space-time fabric to oblivion. It should also account for how space-time came into existence during the Big Bang. Feynman diagrams capture only the minimal ripples of a quantum field and nothing more. So the full picture — what physicists call a “nonperturbative” theory — might be beyond the reach of the geometric paleophysics that these researchers are exploring. “I would be surprised if somehow this told us how to build space-time,” said Daniel Harlow, a theoretical physicist at the Massachusetts Institute of Technology. “My bias is that all the good stuff in quantum gravity is nonperturbative.” Harlow is pursuing another popular research program, known as holography, that seeks to capture space-time in its entirety, including the interiors of black holes, by treating it as a hologram of quantum particles moving around in one lower dimension. Arkani-Hamed agrees that a blindness to the aspects of space-time beyond Feynman diagrams is the greatest weakness of his approach. But his instinct is that the deeper mathematical description of nature from which space-time emerges will touch all of physics in some way, even with the mildest of ripples. “It should leave some echoes everywhere. It can’t just be relevant at the Big Bang,” he said. For his part, he feels that holography isn’t radical enough. It shows how one dimension of space could emerge, but otherwise all the familiar ingredients of quantum theory are there from the start: some space, locality, and a clock to mark time. Arkani-Hamed feels that all of those elements should emerge together from something more primitive — as they do in surfaceology. He stresses that the quest is ambitious and could still stumble at any point. But he and his collaborators and colleagues are charging ahead, encouraged by how far they’ve managed to come. He likens the effort to exploring a jungle in search of a rumored castle. The search party has stumbled upon two marble statues — the amplituhedron and now surfaceology. How could the castle itself not be out there? “To me,” he said, “they are all perfect chunks of some much more perfect thing that we have not yet seen.” Correction:Sept. 25, 2024 The article originally identified Shruti Paranjape as a graduate student at the time of her work on hidden zeros when in fact she was a postdoctoral researcher. Also in Physics particle physics Experiments Ring the ‘Death Knell’ for Sterile Neutrinos By Charlie Wood April 8, 2026 Comment 4 Save Article Read Later Image Gallery A Through-The-Lens Look at the World’s Particle Physics Labs By Zack Savitsky April 1, 2026 Comment 1 Save Article Read Later explainers In Expanding de Sitter Space, Quantum Mechanics Gets Even More Elusive By Shalma Wegsman March 30, 2026 Comment 7 Save Article Read Later Comment on this article Quanta Magazine moderates comments to facilitate an informed, substantive, civil conversation. Abusive, profane, self-promotional, misleading, incoherent or off-topic comments will be rejected. Moderators are staffed during regular business hours (New York time) and can only accept comments written in English. Next article If the Universe Is a Hologram, This Long-Forgotten Math Could Decode It