When quantum particles fly like bees
Quantum simulator provides insights into the dynamics of complex quantum systems
- Date:
- May 12, 2022
- Source:
- University of Innsbruck
- Summary:
- A quantum system with only 51 charged atoms can take on more than two quadrillion different states. Calculating the system's behavior is child's play for a quantum simulator. But verifying the result is almost impossible, even with today's supercomputers. A research team has now shown how these systems can be verified using equations formulated in the 18th century.
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At first glance, a system consisting of 51 ions may appear easily manageable. But even if these charged atoms are only changed back and forth between two states, the result is more than two quadrillion (1015) different orderings which the system can take on.
The behavior of such a system is almost impossible to calculate with conventional computers, especially since an excitation introduced to the system can propagate erratically. The excitation follows a statistical pattern referred to as a Lévy Flight.
One characteristic of such movements is that, in addition to the smaller jumps which are to be expected, also significantly larger jumps take place. This phenomenon can also be observed in the flights of bees and in unusual fierce movements in the stock market.
Simulating quantum dynamics: Traditionally a difficult task
While simulating the dynamics of a complex quantum system is a very tall order for even traditional super computers, the task is child's play for quantum simulators. But how can the results of a quantum simulator be verified without the ability to perform the same calculations it can?
Observation of quantum systems indicated that it might be possible to represent at least the long-term behavior of such systems with equations like the ones the Bernoulli brothers developed in the 18th century to describe the behavior of fluids.
In order to test this hypothesis, the authors used a quantum system which simulates the dynamics of quantum magnets. They were able to use it to prove that, after an initial phase dominated by quantum-mechanical effects, the system could actually be described with equations of the type familiar from fluid dynamics.
Furthermore, they showed that the same Lévy Flight statistics which describe the search strategies used by bees also apply to fluid-dynamic processes in quantum systems.
Captured ions as a platform for controlled quantum simulations
The quantum simulator was built at the Institute for Quantum Optics and Quantum Information (IQOQI) of the Austrian Academy of Sciences at The University of Innsbruck Campus. "Our system effectively simulates a quantum magnet by representing the north and south poles of a molecular magnet using two energy levels of the ions," says IQOQI Innsbruck scientist Manoj Joshi.
"Our greatest technical advance was the fact that we succeeded in individually addressing each one of the 51 ions individually," observes Manoj Joshi. "As a result we were able to investigate the dynamics of any desired number of initial states, which was necessary in order to illustrate the emergence of the fluid dynamics."
"While the number of qubits and the stability of the quantum states is currently very limited, there are questions for which we can already use the enormous computing power of quantum simulators today," says Michael Knap, Professor for Collective Quantum Dynamics at the Technical University of Munich.
"In the near future, quantum simulators and quantum computers will be ideal platforms for researching the dynamics of complex quantum systems," explains Michael Knap. "Now we know that after a certain point in time these systems follow the laws of classic fluid dynamics. Any strong deviations from that are an indication that the simulator isn't working properly."
Story Source:
Materials provided by University of Innsbruck. Note: Content may be edited for style and length.
Journal Reference:
- M. K. Joshi, F. Kranzl, A. Schuckert, I. Lovas, C. Maier, R. Blatt, M. Knap, C. F. Roos. Observing emergent hydrodynamics in a long-range quantum magnet. Science, 2022; 376 (6594): 720 DOI: 10.1126/science.abk2400
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