Quantum Rings in Flux: Bridging Stark and Aharonov-Bohm Effects

Author: Denis Avetisyan

A new theoretical study reveals how driving a magnetic flux through a quantum ring creates energy sidebands, linking the system’s behavior to the AC Stark effect.

The depiction of energy levels transitions from static states-defined for $n=0$ and $n=1$-to quasi-energy sidebands demonstrates how external magnetic fields induce shifts in these levels, resulting in a spectrum of energies beyond the initial, discrete values.

This research demonstrates the equivalence between a time-dependent Aharonov-Bohm effect and an AC Stark shift for a particle confined to a quantum ring.

Confining a quantum particle to a ring threaded by time-varying magnetic flux presents a scenario blurring the lines between foundational quantum effects. This work, ‘AC Stark effect or time-dependent Aharonov-Bohm effect for particle on a ring’, investigates this system, revealing a connection to the AC Stark effect arising from a vector potential-induced, time-dependent perturbation. Specifically, we demonstrate the emergence of distinct quasi-energy sidebands in the particle’s spectrum, offering a potential spectroscopic signature of this interplay. Could precise control of these time-dependent fluxes unlock novel avenues for manipulating quantum states and exploring fundamental quantum phenomena?

Confined Electrons: Unveiling the Quantum Ring

The quantum ring serves as a pivotal theoretical construct for investigating the behavior of electrons within strictly confined spaces, offering a simplified yet powerful analogue to more complex nanoscale systems. Unlike a traditional quantum well – which confines electrons in one or two dimensions – the ring geometry forces electrons to move along a circular path, fundamentally altering their energy levels and wave functions. This confinement leads to quantization of angular momentum, resulting in discrete energy states that are heavily influenced by the ring’s radius and the electron’s effective mass. By analyzing electron behavior within this idealized system, researchers gain crucial insights into phenomena observed in quantum dots, carbon nanotubes, and other emerging nanotechnologies, where electron confinement plays a dominant role in determining material properties and device functionality. The predictable nature of the quantum ring allows for precise theoretical calculations and serves as a benchmark for validating more complex models of electron behavior in constrained geometries, ultimately furthering the development of quantum-based technologies.

A thorough comprehension of the initial Hamiltonian, $H_0$, and its corresponding eigenfunctions, $\psi_n(0)$, forms the cornerstone of any subsequent investigation into the quantum ring system. The Hamiltonian, representing the total energy of the electron within the ring’s potential, dictates the allowed energy states, while the eigenfunctions describe the spatial distribution of the electron in each of those states. Establishing this baseline – a complete understanding of the unperturbed system – is essential because any external influence, such as a magnetic field or applied voltage, will manifest as a perturbation to this initial state. Consequently, accurately determining $H_0$ and $\psi_n(0)$ allows physicists to precisely calculate how the electron’s behavior evolves under these conditions, providing a crucial foundation for predicting and interpreting experimental results and ultimately, controlling the quantum ring’s functionalities.

The defining characteristics of a quantum ring are inextricably linked to its $E_n(0)$ – the system’s inherent energy levels at time zero. These Eigenenergies aren’t merely theoretical values; they fundamentally govern the ring’s response to external stimuli and dictate the allowed quantum states of electrons within its confinement. Each discrete energy level represents a stable configuration, influencing the ring’s optical and electronic properties, such as its absorption spectrum and conductivity. A change in the ring’s physical dimensions or the introduction of perturbations will shift these $E_n(0)$ values, leading to observable alterations in the system’s behavior. Consequently, precise knowledge and control of these initial Eigenenergies are paramount for tailoring quantum rings for specific applications in areas like nanoscale electronics and quantum computing, as they establish the very foundation upon which more complex functionalities are built.

Perturbing the System: Introducing Time-Dependent Magnetic Flux

The introduction of a time-dependent magnetic flux, $Φ_0$, through a quantum ring requires the inclusion of the vector potential, $\mathbf{A}$, in the system’s Hamiltonian to accurately describe the electron’s behavior. Specifically, the azimuthal component of the vector potential, $A_φ$, is necessary to account for the induced electromotive force and its effect on the electron momentum. The canonical momentum, $\mathbf{p} = -i\hbar \nabla + e\mathbf{A}$, must be used instead of the kinetic momentum in the Hamiltonian, effectively modifying the energy eigenvalues and eigenstates of the system. This substitution ensures the gauge invariance of the physical observables and correctly represents the electron’s dynamics under the influence of the oscillating magnetic field.

The introduction of a time-dependent magnetic flux into the quantum ring system necessitates a modified Hamiltonian, $H = \frac{p^2}{2m} + V(r) + \frac{e}{m}p_φA_φ(t)$, to accurately describe the electron’s dynamics. Here, $p_φ$ represents the angular momentum, $A_φ(t)$ is the time-dependent vector potential representing the oscillating magnetic field, and ‘e’ is the elementary charge. The original Hamiltonian, accounting for kinetic and radial potential energy, is augmented by the interaction term involving the vector potential, effectively incorporating the influence of the oscillating magnetic field on the electron’s motion within the ring. This modified Hamiltonian forms the basis for analyzing the system’s response to the time-dependent perturbation and predicting observable phenomena such as sideband transitions.

Optimal analysis of sideband observability in quantum rings necessitates specific parameter ranges. Ring radii should be considered between $10^{-7}$ and $10^{-3}$ meters to maximize the signal. The frequency, $\omega$, of the applied magnetic flux should fall within 10 Hz and 1000 Hz; this range allows for both feasible theoretical calculations and practical experimental implementation, balancing the need for measurable effects with achievable equipment capabilities.

The weighting coefficient Cr, calculated using the parameters α = 10⁶ and a flux ratio of Φ₀/ΦQM = 1.1, exhibits a specific distribution across index r for n=1, resulting in a value of β = 1.375 x 10⁵.

Mathematical Tools: Deconstructing the Wavefunction

The Jacobi-Anger expansion is a mathematical tool utilized to express functions of the form $e^{iz\sin\theta}$ or $e^{iz\cos\theta}$ as infinite series involving Bessel functions and trigonometric polynomials. In the context of time-dependent magnetic flux, sinusoidal terms arise from the oscillatory nature of the flux through a superconducting loop. Direct analysis of these terms is often intractable; the Jacobi-Anger expansion provides a method to rewrite these sinusoidal functions into a more manageable series form. This expansion is essential for solving the relevant differential equations and ultimately determining the system’s behavior under the influence of the oscillating field. The resulting series allows for the separation of variables and the calculation of energy eigenvalues, which would otherwise be obscured by the complex oscillatory terms.

The Jacobi-Anger expansion facilitates the calculation of Eigenenergies, denoted as $E_n$, which represent the allowed energy states of the system under the influence of a time-dependent magnetic flux. These calculated $E_n$ values demonstrate a deviation from the energy levels observed in the absence of the oscillating field, indicating energy level shifts. The magnitude of these shifts is directly proportional to the strength of the magnetic flux perturbation and provides quantitative data on the system’s response to the external field. Analysis of the $E_n$ values allows for the determination of how the oscillating field modifies the energy landscape and influences the system’s quantum behavior.

Energy level shifts induced by time-dependent magnetic flux are quantified using the concept of the Quantum Flux, denoted as $Φ_{QM}$. This normalization provides a standardized unit for measuring the magnitude of the perturbation. Observation of these shifted energy levels is contingent upon the ratio of the magnetic flux $Φ_0$ to the Quantum Flux $Φ_{QM}$ being a non-integer value. Integer ratios of $Φ_0/Φ_{QM}$ result in no observable energy shifts, as the oscillating field aligns with the system’s natural frequencies and does not induce transitions between energy levels.

Observable Effects: Unveiling Persistent Currents and Sidebands

A quantum ring, when subjected to a sinusoidally varying magnetic flux, exhibits a fascinating phenomenon: the induction of a persistent current. This isn’t a simple flow of electrons, but rather a consequence of quantum mechanical effects arising from the ring’s geometry and the time-dependent flux. The oscillating magnetic field doesn’t simply drive a current; it effectively ‘pumps’ electrons around the ring due to the quantization of flux. This induced current is persistent in the sense that it continues to circulate even without a continuous driving force, sustained by the quantum nature of the electron wavefunction within the confined space of the ring. The magnitude of this current is critically dependent on the frequency and amplitude of the applied flux, demonstrating a complex interplay between the driving field and the ring’s inherent quantum properties. This effect provides a unique platform for exploring fundamental aspects of mesoscopic physics and potentially realizing novel electronic devices.

The application of a time-dependent magnetic flux doesn’t simply induce a current; it fundamentally alters the energy landscape of the quantum ring, manifesting as quasi-energy sidebands. These sidebands aren’t distinct energy levels, but rather a consequence of observing the system from a rotating reference frame – akin to how a spinning wheel appears different depending on the observer’s motion. This transformation shifts the original energy levels, creating a series of ‘sidebands’ alongside the central energy state. The intensity of each sideband reveals the probability of transitioning to that shifted energy level, providing insight into the system’s response to the oscillating field. Essentially, the rotating frame perspective allows researchers to analyze the system’s behavior as if it were experiencing a static, altered energy spectrum, simplifying the complex dynamics induced by the time-varying flux.

The emergence of quasi-energy sidebands in the quantum ring, induced by the oscillating magnetic flux, shares a compelling analogy with the AC Stark effect, a well-established phenomenon in atomic physics. This connection illustrates how a time-dependent perturbation can modify energy levels, shifting them and creating new, albeit transient, states. Analysis reveals these sidebands aren’t equally populated; the $n=1$ level exhibits a significantly stronger weighting factor of approximately 0.21 compared to the $n=0$ level at 0.063. This disparity suggests that the higher energy level is more readily influenced by the oscillating field, indicating a pronounced preference for excitation to this state under these specific conditions and providing insight into the system’s response to external stimuli.

The study of quantum rings subjected to time-dependent magnetic flux reveals a nuanced interplay between seemingly disparate phenomena. The observed connection to the AC Stark effect, alongside the prediction of quasi-energy sidebands, highlights the sensitivity of quantum systems to external perturbations. This work underscores that a single model, however elegant, may not fully encapsulate reality; rather, validation requires rigorous examination of its limitations. As Max Planck observed, “A new scientific truth does not triumph by convincing its opponents and proclaiming that they are wrong. It triumphs only by making the opponents realize that they were wrong.” The sidebands, a direct consequence of the time-varying flux, serve as observable indicators, potentially falsifying or refining existing theoretical frameworks, and demonstrating the importance of considering sensitivity to external factors when interpreting quantum behavior.

Where Do We Go From Here?

The correspondence drawn between the time-dependent Aharonov-Bohm effect and the AC Stark effect within a quantum ring is, predictably, not a final statement. The calculations presented offer a framework, but rely on idealized conditions – perfect rings, sinusoidal flux variation, and a neglect of decoherence. Real systems will deviate. The true utility of this work lies not in what it confirms, but in the errors it will reveal. Identifying and quantifying those deviations-the influence of ring imperfections, higher harmonic distortions in the flux, and, crucially, the unavoidable interaction with the environment-represents the next logical step.

Moreover, the predicted quasi-energy sidebands, while theoretically sound, present a significant experimental challenge. Distinguishing these subtle spectral features from other broadening mechanisms will require exquisitely controlled experiments and advanced spectral analysis techniques. The effort, however, is not merely about verifying a calculation. It’s about probing the limits of the quasi-energy formalism itself – understanding when, and where, it breaks down in the face of complex interactions.

Data isn’t the goal-it’s a mirror of human error. Even what can’t be measured still matters-it’s just harder to model. The field will likely shift from seeking confirmation of this particular effect to employing the quantum ring as a sensitive probe of fundamental limitations in quantum control and measurement. The imperfections are the message, after all.

Original article: https://arxiv.org/pdf/2512.15935.pdf

Contact the author: https://www.linkedin.com/in/avetisyan/

Confined Electrons: Unveiling the Quantum Ring

Perturbing the System: Introducing Time-Dependent Magnetic Flux

Mathematical Tools: Deconstructing the Wavefunction

Observable Effects: Unveiling Persistent Currents and Sidebands

Where Do We Go From Here?

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