## Abstract

Majorana zero modes are leading candidates for topological quantum computation due to non-local qubit encoding and non-abelian exchange statistics. Spatially separated Majorana modes are expected to allow phase-coherent single-electron transport through a topological superconducting island via a mechanism referred to as teleportation. Here we experimentally investigate such a system by patterning an elongated epitaxial InAs-Al island embedded in an Aharonov-Bohm interferometer. With increasing parallel magnetic field, a discrete sub-gap state in the island is lowered to zero energy yielding persistent 1*e*-periodic Coulomb blockade conductance peaks (*e* is the elementary charge). In this condition, conductance through the interferometer is observed to oscillate in a perpendicular magnetic field with a flux period of *h*/*e* (*h* is Planck’s constant), indicating coherent transport of single electrons through the islands, a signature of electron teleportation via Majorana modes.

### Similar content being viewed by others

## Introduction

Initial experiments reporting signatures of Majorana zero modes (MZMs) in hybrid superconductor–semiconductor nanowires focussed on zero-bias conductance peaks (ZBPs) using local tunneling spectroscopy^{1,2,3,4}. Subsequently, Majorana islands provided additional evidence of MZMs based on nearly 1*e*-spaced Coulomb blockade (CB) peaks^{5}, and indicated a Rashba-like spin–orbit coupling with the spin–orbit field lying in-plane, perpendicular to the wire axis^{6}. Under some circumstances, these signatures can be mimicked by trivial modes^{7,8,9}, motivating a new generation of experiments that explicitly probe non-local properties, which are more difficult to mimic. For instance, non-locality of MZMs was recently investigated by measuring the energy splitting induced by the interaction of a quantum dot and a zero-energy state in a hybrid nanowire^{10}.

Non-locality can also be accessed by interferometric measurements of a Majorana island, where CB couples separated MZMs and fixes fermion parity^{11,12,13,14,15}. In the topological regime, a Majorana island can coherently transfer a single-electron between its two ends through MZMs^{11,12}. To demonstrate the effect, a Majorana island can be embedded in the arm of an Aharonov–Bohm (AB) interferometer. If single-electron transport in both the reference arm and the Majorana island is coherent, conductance through the interferometer is expected to show oscillations with a flux period *h*/*e*^{11,16}. In addition, interferometry offers a way to distinguish between localized trivial modes and MZMs^{12,14}. This technique was used to investigate coherent transport in semiconductor quantum dots^{17,18,19,20}.

In this work, we study coherent single-electron transport through a Majorana island with an AB interferometer. At high magnetic fields, we observe 1*e* periodic CB peaks due to a discrete zero-energy state. In this case, we observe the conductance through the interferometer to oscillate periodically for a flux *h*/*e* piercing the AB ring, while oscillations are suppressed when the island shows a 2*e* periodicity or is in the normal state. The observation of conductance oscillations in the 1*e* regime indicates coherent single-electron transport through the Majorana island, as predicted for electron teleportation mediated by MZMs^{11}.

## Results

### Majorana island interferometer

Devices were fabricated using an InAs two-dimensional electron gas (2DEG) heterostructure covered by 8 nm of epitaxially grown Al^{21}. The bare 2DEG (without Al) showed a phase coherence length of *l*_{ϕ} ~ 4 μm (see Supplementary Fig. 1). Figure 1a shows a micrograph of device 1 with a 1.2 μm long and 0.1 μm wide superconducting Al stripe formed by wet etching. Ti/Au top-gates were evaporated on top of a 25 nm HfO_{2} dielectric grown by atomic layer deposition. We studied two lithographically similar interferometers with circumferences *L*_{loop} of 5.6 μm for device 1 and 5 μm for device 2.

Applying a negative voltage, *V*_{pg}, to the central gate serves two purposes. It depletes the 2DEG surrounding the Al wire to form both the Majorana island and the AB ring center and also adjusts the chemical potential and charge occupancy of the island. Energizing all exterior gates confines the 2DEG into an AB interferometer by connecting the Majorana island to a normal conducting reference arm. The resistance of the reference arm was independently tuned by a negative gate voltage *V*_{c}. A source-drain bias voltage (*V*_{sd}) was applied to one lead and the resulting current and four-terminal voltage was recorded. The in-plane magnetic fields *B*_{∥} and *B*_{t}, and perpendicular field, *B*_{⊥}, were controlled by a three-axis vector magnet.

At low temperatures, tunneling of single electrons onto a Majorana island with a superconducting gap *Δ* is suppressed by CB, except at charge degeneracies. When the lowest sub-gap state energy, *E*_{0}, exceeds the charging energy *E*_{c}, ground-state degeneracies only occur between even-occupied states, resulting in 2*e*-periodic CB conductance peaks^{22}. Odd-occupied ground states are lowered into the accessible spectrum by a Zeeman field, resulting in even–odd CB peak spacing when 0 < *E*_{0} < *E*_{c}. The difference in peak spacings between even and odd states, *S* = *S*_{e} − *S*_{o}, is proportional to *E*_{0}^{5} (see Fig. 1b). For well-separated MZMs, *E*_{0} tends exponentially toward zero, yielding 1*e* periodic CB peaks with a discrete zero-bias state at consecutive charge degeneracy point^{5,23}. Both observations are necessary for a MZM interpretation. When MZMs are not widely separated, CB peak spacings oscillate with field and chemical potential^{5,6,7}.

### CB spectroscopy

We first investigated the Majorana island without interferometry by depleting a segment of the reference arm (see Fig. 1a). Figure 1b shows zero-bias differential conductance *G* = d*I*/d*V* of the island as a function of parallel magnetic field *B*_{∥} and gate voltage *V*_{pg}, which controls the electron occupancy and chemical potential of the island. CB peaks are 2*e* periodic at zero field and split around 2 T, becoming 1*e* periodic as the sub-gap state moves toward zero energy (see Fig. 3a for peak spacing analysis). Performing CB spectroscopy, that is, measuring *G* as a function of both source-drain bias *V*_{sd} and *V*_{pg} reveals Coulomb diamonds (Fig. 1c–f). At low *B*_{∥}, diamonds are 2*e* periodic with distinct negative differential conductance (Fig. 1c), which transition to an even–odd peak spacing difference at moderate fields (Fig. 1d), similar to previous work on superconducting Coulomb islands^{5,6,22,24,25,26,27}. At high fields, the 1*e* periodic diamonds show a discrete ZBP for consecutive charge degeneracy points that is well separated from the superconducting gap (Fig. 1e). This sub-gap feature remained at zero bias until the superconducting gap closure, and persists for 3 mV in *V*_{pg}, corresponding to an energy range of 0.8 meV. For systems with strong spin–orbit interaction, a helical gap of *g**μ*_{B}*B*_{∥} is expected, where *μ*_{B} and *g* are the Bohr magneton and electron *g*-factor, respectively. We estimate a helical gap of ~0.6 meV at *B*_{∥} = 2.5 T for a *g*-factor of 4, comparable to the span of the ZBP in *V*_{pg}. The stability of the zero-bias state in both magnetic field and in chemical potential is consistent with the MZM picture (see Supplementary Fig. 2)^{5}, however, the observation of coherent single-electron transport is needed to draw conclusions about non-locality. Below, we additionally show that the zero-bias state is sensitive to rotations of the in-plane field. The magnitude of *B*_{∥} where 1*e* periodicity is observed is in agreement with ZBPs measured in tunneling spectroscopy in InAs 2DEGs^{3}. In contrast, as a function of *B*_{t} the peak spacing showed an oscillating even–odd periodicity, and no consecutive ZBPs were observed (see Supplementary Fig. 3d–f), as expected for extended modes in the wire^{6,9,28}. The normal state 1*e* regime of the Majorana island appears above *B*_{∥} ~ 3 T with *E*_{c} = 80 μeV (Fig. 1f), where no discrete ZBPs are observed (see Supplementary Figs. 2 and 3a–c).

### Interferometry and coherent single-electron transport

The reference arm of the AB interferometer was connected to the Majorana island by tuning *V*_{c} from −8 to −3 V while *V*_{pg} was compensated. This lifted the overall conductance by opening a path through the reference arm (see Fig. 2a-d). Fig. 2e–h shows the conductance Δ*G* through the full interferometer (with smooth background subtracted; see “Methods” section) as a function of *B*_{⊥} and gate voltage *V*_{pg}, which control the flux in the interferometer and occupancy of the island, respectively. Figure 2e shows small oscillations in Δ*G*(*B*_{⊥}) at *B*_{∥} = 0 T for the 2*e* periodic peaks. For *B*_{∥} = 2.2 T, where the peak spacing is even–odd (Fig. 2f), the conductance showed moderate oscillations with a period Δ*B*_{⊥} = 1.5 mT. This periodicity corresponds to a single flux quantum *h*/*e* threading an area of ~2.7 μm^{2}, consistent with the ring center area defined by *V*_{pg}. This indicates coherent 1*e* transport through both the reference arm and the Majorana island. At *B*_{∥} = 2.7 T, the CB peak spacing is uniformly 1*e*, and oscillation amplitude is maximal (see Fig. 2g). When the Majorana island is driven normal, *B*_{∥} > 3 T, conductance oscillations are reduced, becoming comparable to the low field oscillations (Fig. 2h). The appearance of strong *h*/*e* periodic conductance oscillations in the 1*e* regime of the island is a key experimental signature of electron teleportation.

The strength and periodicity of the oscillations are examined more quantitatively using Fourier power spectrum (PS) analysis (see “Methods” section). In Fig. 2i–l, the PS of Δ*G*(*B*_{⊥}) are shown. Increasing *B*_{∥} leads to a peak appearing around *f* = 0.65 mT^{−1}, the frequency expected for AB interference. The PS is maximized in the 1*e* regime. To quantify the oscillations amplitude, \(\langle \tilde{A}\rangle\), we average the integrated PS (see “Methods” section).

We next correlate the *B*_{∥} dependence of the oscillations amplitude, \(\langle \tilde{A}\rangle (B_\parallel )\), with the *B*_{∥} dependence of the lowest sub-gap state, *E*_{0}(*B*_{∥}), of the island. The sub-gap energy is found from the difference between even and odd CB peak spacings, averaged separately, 〈*S*〉 = 〈*S*_{e}〉−〈*S*_{o}〉 (see Fig. 1b). In Fig. 3a, 〈*S*〉 remains constant as a function of *B*_{∥} (indicating 2*e* transport) until a sub-gap state moves below *E*_{c}, reaching zero at 2.2 T without overshoot (as expected for well separated MZMs in a long wire^{5,23}). At low fields, where the CB periodicity is 2*e*, the oscillation amplitude \(\langle \tilde{A}\rangle\) is small (Fig. 3b). When 〈*S*〉 approaches zero at high fields (*B*_{∥} > 2 T), \(\langle \tilde{A}\rangle\) exhibits a sharp increase that coincides with the 2*e* to 1*e* transition. Above 3 T, the device is in the normal state and \(\langle \tilde{A}\rangle\) returned to the low value found in the 2*e* regime. This comparison shows that the oscillation amplitude is correlated with the energy of the lowest subgap state, and is maximal in the 1*e* superconducting regime, as expected for electron teleportation.

Figure 3c, d shows a similar study for device 2. In Fig. 3c, 〈*S*〉 shows strong even–odd below 1 T, fluctuates around 〈*S*〉 = 0 between 1 and 2 T, then settles to 1*e* (〈*S*〉 = 0) above 2 T. CB spectroscopy reveals a discrete state that oscillates around zero bias in both *B*_{∥} and *V*_{pg} without forming a stable 1*e* periodic zero-bias peak (see Supplementary Fig. 5). These oscillations about zero energy are compatible with hybridized Majorana modes due to wavefunction overlap resulting from the finite island length^{9,28}. This overlap causes an energy splitting that oscillates both in field and chemical potential^{5,6,27}. Figure 3d shows that phase coherent transport first appears above 1 T and \(\langle \tilde{A}\rangle\) gradually increases until reaching a maximum amplitude for 1*e* peak spacing at 2.1 T, before diminishing in the normal state. In comparison to device 1, phase coherent transport appears when 〈*S*〉 oscillations about zero, suggesting that hybridized Majorana modes characterized by an extended wavefunction may also contribute to coherent transport. The absence of energy oscillations may distinguish non-local MZMs from hybridized Majorana modes (see Fig. 3a, c). We attribute the reduced oscillation amplitude in device 1 to result from the longer loop length *L*_{loop} > *l*_{ϕ}, leading to increased dephasing in the reference arm.

We observe that conductance oscillations measured on opposite sides of a CB peak in the 1*e* regime are out of phase (see yellow ticks in the insets of Fig. 3) indicating a transmission phase shift of *π* is acquired when the parity of the island is flipped. This demonstrates interferometric detection of island parity, which offers a way to detect MZM parity as proposed by several recent topological qubit schemes^{13,29,30}. In some cases, we found that the the phase shift is restored through the CB valley, such that the same sides of adjacent CB peaks have the same phase. What determines whether there is phase recovery in the CB valley is not currently understood (see Supplementary Fig. 6)^{15,18,19,20}.

The angular dependence of the in-plane magnetic field is investigated by fixing the field magnitude *B*_{r} = 2.5 T and rotating the field by an angle *α* (see Fig. 1). Theoretically, a rotation of the in-plane field towards the Rashba field direction is expected to close the topological gap^{31}. Figure 4a shows 1*e* periodic Coulomb diamonds at *B*_{∥} = 2.5 T with a discrete ZBP at each charge degeneracy point (similar to Fig. 1e). Rotating by an angle *α* = 5° lifted the discrete state from zero energy, leading to even-odd peak spacing; at *α* = 10°, 1*e* periodicity is recovered, though without a discrete ZBP. The observed sensitivity of the zero-energy state to in-plane field rotation is consistent with MZMs^{31}.

Small rotations (∣*α*∣ < 7.5°) reduced the oscillation amplitude, \(\langle \tilde{A}\rangle\), as expected for even–odd periodicity (see Fig. 3). However, at larger angles (∣*α*∣ > 10°) where the discrete ZBP is absent, a strong interference signal is observed (Fig. 4d). The observation of coherent transport in the absence of a discrete zero-energy state suggests trivial extended modes are also phase coherent over the length of the island. Therefore, the additional information provided by bias spectroscopy is needed to distinguish teleportation from other coherent transport mechanisms, as shown in Fig. 4a–c.

We further studied the effect of different magnetic field directions. The results are shown in Supplementary Fig. 7. In summary, all three axes showed coherent transport, with oscillation amplitude first increasing as 〈*S*〉 approached zero. This shows that the oscillation amplitude is dictated by the energy *E*_{0} in all field directions and indicates that interference is not unique to a parallel magnetic field.

Finally, we comment on the physical mechanism that correlates the oscillation amplitude to the energy of *E*_{0}. At low fields, the Majorana island favors an even parity where transport of electrons occurs as two sequential tunneling events on either end of the island^{22,25}. The two electrons acquire the condensate phase when forming a Cooper pair, which suppresses single-electron coherence. At moderate fields, a discrete sub-gap state is brought below *E*_{c} and a single-electron transport channel is opened, allowing coherent resonant tunneling through the Majorana island. When the discrete state is brought to zero-energy, the contribution of coherent transport is increased due to electron teleportation. Finally, in the normal state, we interpret the reduction in interference signal to reflect the short coherence length in the diffusive Al wire.

In conclusion, we report signatures of single-electron teleportation via non-local MZMs using AB interference in combination with spectroscopy of a discrete zero-energy state. Our results also reveal that coherent transport by topologically trivial modes extending over the full length of the Majorana island are allowed. These extended trivial modes may be precursors of topological states in a finite length system that could transition into non-local MZMs by adjusting experimental parameters^{28}. We have shown that interferometry accompanying bias spectroscopy revealing stable 1*e* periodic CB in magnetic field and chemical potential can discriminate non-local MZMs from extended modes (that display characteristic energy oscillations). Increasing the wire length to greatly exceed the diffusive coherence length \(\xi =\sqrt{{\xi }_{0}\,{l}_{e}} \sim 1\) μm (for *Δ* = 75 μeV at *B*_{∥} = 2.5 T), where *ξ*_{0} is the clean coherence length and *l*_{e} ~ 300 nm is the semiconducting mean free path will suppress 1*e* transport via trivial extended modes^{32}. The observation of coherent transport through the island rules out localized ABS at the ends of the wire as the source of the studied zero-bias state. Indeed, transport flips the parity of localized modes and suppresses interference, while transport through MZMs preserves island parity and coherent transport^{12,14}. These localized modes could have been a possible interpretation of the previously observed ZBPs in single-end tunneling experiments^{8,9}.

These results suggest that InAs–Al 2DEGs are a promising route towards more complex experiments related to the braiding or fusion of MZMs. We have established coherent transport and parity readout from the transmission phase shifts in Majorana islands, two key results for future topological qubit networks^{13,29,30}. Future devices will take advantage of improved material quality to allow for increased wire lengths to suppress coherent trivial quasiparticle transport, allowing MZM contributions to be better separated from other potential contributions.

## Methods

### Wafer structure

The devices were fabricated on wafers grown by molecular beam epitaxy on a InP substrate. The wafer stack consists of a 1 μm graded In_{1−x}Al_{x}As insulating buffer, a 4 nm In_{0.81}Ga_{0.19}As bottom barrier, a 5 nm InAs quantum well, and a top barrier consisting of 5 nm In_{0.9}Al_{0.1}As for device 1 and 10 nm In_{0.81}Ga_{0.19}As for device 2. A 7 nm film of epitaxial Al was then grown in situ without breaking the vacuum of the chamber. The InAs 2DEGs were characterized with a Hall bar geometry (Al removed), which showed a peak mobility of *μ* = 17,000 cm^{2} V^{−1} s^{−1} for an electron density of *n* = 1.7 × 10^{12} cm^{−2} and *n* = 7.5 × 10^{11} cm^{−2} for devices 1 and 2, respectively.

### Device fabrication

Devices were fabricated using standard electron beam lithography techniques. The devices were electrically isolated by etching mesa structures by first removing the top Al film with Al etchant Transene D, followed by a deep III–V chemical wet etch H_{2}O:C_{6}H_{8}O_{7}:H_{3}PO_{4}:H_{2}O_{2} (220:55:3:3). Next, the Al film on the mesa was selectively etched with Al etchant Transene D to produce the Al strip. A 25 nm-thick layer of insulating HfO_{2} was grown by atomic layer deposition at a temperature of 90 °C over the entire sample. Top gates of Ti/Au (5/25 nm) were then evaporated and connected to bonding pads with leads of Ti/Au (5/250 nm).

### Measurements

Electrical measurements were performed by standard lock-in techniques at 166 Hz by applying the sum of a variable dc bias voltage *V*_{sd} and an ac excitation voltage of 3–10 μV applied to one of the top ohmic contacts as shown in Fig. 1a. The resulting current across the device was recorded by grounding a bottom ohmic via a low-impedance current-to-voltage converter, and the four terminal voltage was measured by an ac voltage amplifier with an input impedance of 500 MΩ. All measurements were taken in a dilution refrigerator with a base temperature of 20 mK and an electron temperature of 40 mK estimated by the temperature dependence saturation of ZBP conductance^{3}.

### Data analysis

To highlight the oscillating components of the differential conductance *G*(*B*_{⊥}), a smooth background was subtracted with a low-degree polynomial Savitzky–Golay filter resulting in Δ*G*^{33}. Analysis of the oscillations was performed by first performing a fast Fourier transform *F*(*f*) of Δ*G*(*B*_{⊥}) using a Hanning window then calculating the power spectral density *P**S*(*f*) = ∣*F*(*f*)∣^{2}. The oscillation amplitude \(\langle \tilde{A}\rangle\) was obtained by averaging integrated power spectra. The integration was limited to a band in frequency between *f*_{1} = 0.55 mT^{−1} and *f*_{2} = 0.75 mT^{−1}, spanning the range of a single flux quantum *Φ*_{0} = *h*/*e* through the area *A* defined by either the central gate (*A*_{1} = 2.25 μm^{2}) or the exterior gates (*A*_{2} = 3.1 μm^{2}), where *f* = *A*/*Φ*_{0} (see Fig. 2i–l).

## Data availability

The data that support the findings of this study are available from the corresponding authors on reasonable request.

## References

Mourik, V. et al. Signatures of Majorana fermions in hybrid superconductor–semiconductor nanowire devices.

*Science***336**, 1003–1007 (2012).Deng, M. et al. Majorana bound state in a coupled quantum-dot hybrid-nanowire system.

*Science***354**, 1557–1562 (2016).Nichele, F. et al. Scaling of Majorana zero-bias conductance peaks.

*Phys. Rev. Lett.***119**, 136803 (2017).Zhang, H. et al. Quantized Majorana conductance.

*Nature***556**, 74–79 (2018).Albrecht, S. M. et al. Exponential protection of zero modes in Majorana islands.

*Nature***531**, 206–209 (2016).O’Farrell, E. C. T. et al. Hybridization of sub-gap states in one-dimensional superconductor/semiconductor Coulomb islands.

*Phys. Rev. Lett.***121**, 256803 (2018).Chiu, C.-K., Sau, J. D. & Sarma, S. D. Conductance of a superconducting Coulomb-blockaded Majorana nanowire.

*Phys. Rev. B***96**, 054504 (2017).Moore, C., Stanescu, T. D. & Tewari, S. Two-terminal charge tunneling: disentangling Majorana zero modes from partially separated Andreev bound states in semiconductor–superconductor heterostructures.

*Phys. Rev. B***97**, 165302 (2018).Prada, E. et al. From Andreev to Majorana bound states in hybrid superconductor–semiconductor nanowires. Preprint at arXiv:1911.04512 (2019).

Deng, M.-T. et al. Nonlocality of Majorana modes in hybrid nanowires.

*Phys. Rev. B***98**, 085125 (2018).Fu, L. Electron teleportation via Majorana bound states in a mesoscopic superconductor.

*Phys. Rev. Lett.***104**, 056402 (2010).Sau, J. D., Swingle, B. & Tewari, S. Proposal to probe quantum nonlocality of Majorana fermions in tunneling experiments.

*Phys. Rev. B***92**, 020511 (2015).Vijay, S. & Fu, L. Teleportation-based quantum information processing with Majorana zero modes.

*Phys. Rev. B***94**, 235446 (2016).Hell, M., Flensberg, K. & Leijnse, M. Distinguishing Majorana bound states from localized Andreev bound states by interferometry.

*Phys. Rev. B***97**, 161401 (2018).Drukier, C., Zirnstein, H.-G., Rosenow, B., Stern, A. & Oreg, Y. Evolution of the transmission phase through a Coulomb-blockaded Majorana wire.

*Phys. Rev. B***98**, 161401 (2018).Aharonov, Y. & Bohm, D. Significance of electromagnetic potentials in the quantum theory.

*Phys. Rev.***115**, 485 (1959).Yacoby, A., Schuster, R. & Heiblum, M. Phase rigidity and

*h*/2*e*oscillations in a single-ring Aharonov–Bohm experiment.*Phys. Rev. B***53**, 9583 (1996).Schuster, R. et al. Phase measurement in a quantum dot via a double-slit interference experiment.

*Nature***385**, 417–420 (1997).Avinun-Kalish, M., Heiblum, M., Zarchin, O., Mahalu, D. & Umansky, V. Crossover from ‘mesoscopic’ to ‘universal’ phase for electron transmission in quantum dots.

*Nature***436**, 529–533 (2005).Edlbauer, H. et al. Non-universal transmission phase behaviour of a large quantum dot.

*Nat. Commun.***8**, 1710 (2017).Shabani, J. et al. Two-dimensional epitaxial superconductor–semiconductor heterostructures: a platform for topological superconducting networks.

*Phys. Rev. B***93**, 155402 (2016).Hekking, F. W. J., Glazman, L. I., Matveev, K. A. & Shekhter, R. I. Coulomb blockade of two-electron tunneling.

*Phys. Rev. Lett.***70**, 4138 (1993).Van Heck, B., Lutchyn, R. M. & Glazman, L. I. Conductance of a proximitized nanowire in the Coulomb blockade regime.

*Phys. Rev. B***93**, 235431 (2016).Tuominen, M. T., Hergenrother, J. M., Tighe, T. S. & Tinkham, M. Experimental evidence for parity-based 2e periodicity in a superconducting single-electron tunneling transistor.

*Phys. Rev. Lett.***69**, 1997 (1992).Eiles, T. M., Martinis, J. M. & Devoret, M. H. Even–odd asymmetry of a superconductor revealed by the Coulomb blockade of Andreev reflection.

*Phys. Rev. Lett.***70**, 1862 (1993).Higginbotham, A. P. et al. Parity lifetime of bound states in a proximitized semiconductor nanowire.

*Nat. Phys.***11**, 1017–1021 (2015).Shen, J. et al. Parity transitions in the superconducting ground state of hybrid InSb–Al Coulomb islands.

*Nat. Commun.***9**, 4801 (2018).Stanescu, T. D., Lutchyn, R. M. & Sarma, S. D. Dimensional crossover in spin–orbit-coupled semiconductor nanowires with induced superconducting pairing.

*Phys. Rev. B***87**, 094518 (2013).Karzig, T. et al. Scalable designs for quasiparticle-poisoning-protected topological quantum computation with Majorana zero modes.

*Phys. Rev. B***95**, 235305 (2017).Plugge, S., Rasmussen, A., Egger, R. & Flensberg, K. Majorana box qubits.

*New J. Phys.***19**, 012001 (2017).Osca, J., Ruiz, D. & Serra, L. Effects of tilting the magnetic field in one-dimensional Majorana nanowires.

*Phys. Rev. B***89**, 245405 (2014).Tinkham, M.

*Introduction to Superconductivity*(Courier Corporation, 2004).Savitzky, A. & Golay, M. J. Smoothing and differentiation of data by simplified least squares procedures.

*Anal. Chem.***36**, 1627–1639 (1964).

## Acknowledgements

This work was supported by Microsoft Corporation, the Danish National Research Foundation, and the Villum Foundation. F.N. acknowledges support from European Research Commission, Grant No. 804273. We thank Karsten Flensberg, Joshua Folk, Michael Hell, Andrew Higginbotham, Torsten Karzig, Panagiotis Kotetes, Martin Leijnse, Tommy Li, Alice Mahoney, and Ady Stern for useful discussions.

## Author information

### Authors and Affiliations

### Contributions

T.W., C.T., S.G., R.K., G.C.G. and M.J.M. developed and grew the InAs/Al heterostructure. A.M.W. and A.F. designed and fabricated the devices. A.M.W. and A.F. performed the measurements. Data analysis was done by A.M.W. and A.F with input from C.M.M. and F.N. C.M.M. and F.N. conceived the experiment. A.M.W. and A.F. interpreted the data with input from E.C.T.O., A.C.C.D., C.M.M. and F.N. The manuscript was written by A.M.W., A.F., C.M.M. and F.N. with suggestions from all other authors.

### Corresponding authors

## Ethics declarations

### Competing Interests

The authors declare no competing interests.

## Additional information

**Peer review information** *Nature Communications* thanks Ramón Aguado and the other, anonymous, reviewer(s) for their contribution to the peer review of this work.

**Publisher’s note** Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.

## Supplementary information

## Rights and permissions

**Open Access** This article is licensed under a Creative Commons Attribution 4.0 International License, which permits use, sharing, adaptation, distribution and reproduction in any medium or format, as long as you give appropriate credit to the original author(s) and the source, provide a link to the Creative Commons license, and indicate if changes were made. The images or other third party material in this article are included in the article’s Creative Commons license, unless indicated otherwise in a credit line to the material. If material is not included in the article’s Creative Commons license and your intended use is not permitted by statutory regulation or exceeds the permitted use, you will need to obtain permission directly from the copyright holder. To view a copy of this license, visit http://creativecommons.org/licenses/by/4.0/.

## About this article

### Cite this article

Whiticar, A.M., Fornieri, A., O’Farrell, E.C.T. *et al.* Coherent transport through a Majorana island in an Aharonov–Bohm interferometer.
*Nat Commun* **11**, 3212 (2020). https://doi.org/10.1038/s41467-020-16988-x

Received:

Accepted:

Published:

DOI: https://doi.org/10.1038/s41467-020-16988-x

## Comments

By submitting a comment you agree to abide by our Terms and Community Guidelines. If you find something abusive or that does not comply with our terms or guidelines please flag it as inappropriate.