Abstract
Topological superconductivity is central to a variety of novel phenomena involving the interplay between topologically ordered phases and brokensymmetry states. The key ingredient is an unconventional order parameter, with an orbital component containing a chiral p _{ x } + ip _{ y } wave term. Here we present phasesensitive measurements, based on the quantum interference in nanoscale Josephson junctions, realized by using Bi_{2}Te_{3} topological insulator. We demonstrate that the induced superconductivity is unconventional and consistent with a signchanging order parameter, such as a chiral p _{ x } + ip _{ y } component. The magnetic field pattern of the junctions shows a dip at zero externally applied magnetic field, which is an incontrovertible signature of the simultaneous existence of 0 and π coupling within the junction, inherent to a non trivial order parameter phase. The nanotextured morphology of the Bi_{2}Te_{3} flakes, and the dramatic role played by thermal strain are the surprising key factors for the display of an unconventional induced order parameter.
Introduction
The notion of superconducting materials with fully gapped order parameters, but that still support topologically protected surface states^{1,2,3,4,5}, including Majorana bound states^{2,3}, are currently subject to much attention. Such systems intertwine two key paradigms in condensed matter physics, namely spontaneous symmetry breaking and topology, which has been predicted to cause unusual quantum phenomena with even direct analogies to concepts in highenergy physics, such as axion couplings^{6}. This novel physics has been recently predicted to occur also in systems where the superconducting phenomenon involves topological Dirac electrons and it can be induced by the proximity with a conventional superconductor.
Heterostructures involving a conventional superconductor (S) and an exotic conductor, represented by the surface of a threedimensional (3D) topological insulator^{7,8,9,10,11} (TI) and the edge states of twodimensional quantum wells^{12,13}, are ideal systems to emulate topological superconductivity. In the pioneering work by Fu and Kane^{1}, the superconductivity induced in the surface states of a 3D TI is described, in a basis where the operators acquire a phase factor, by an order parameter (OP) that resembles a spinless chiral p _{ x } + ip _{ y } (p) but does not break timereversal symmetry. In a subsequent work, Tkatchov et al.^{14} have derived, this time in a canonical operator basis, that the induced superconductivity has an orbital term of the type p + swave with the p part, consisting of conventional chiral p _{ x } + ip _{ y } and p _{ x } − ip _{ y }, that sums up with the swave term through Pauli matrices to form the total superconducting order parameter.
It is clear that the first step that must be taken to unveil the rich variety of the predicted phenomena related to topological superconductivity is to clearly demonstrate the unconventional nature of the OP, which identifies in a chiral p _{ x } + ip _{ y } (pwave) orbital term. In compounds like the Sr_{2}RuO_{4} layered perovskite, for example, considered the archetype of a topological superconductor, the existence of a chiral p _{ x } + ip _{ y } wave orbital order, with a nontrivial internal phase, is still not generally accepted^{15}. The appearance of Majorana fermions and topological quantum computation are fundamentally encoded in the properties of such pwave superconductivity.
Josephson interferometry emerges as a crucial tool to show key features of the superconductivity involving topological Dirac electrons, as for instance supercurrents induced in the helical edge states of HgTe/HgCdTe^{12} and InAs/GaSb^{13} 2D TI quantum wells. The helical metallic surface states of 3D TI, probed by Josephson interferometry have shown, up to now, a mostly conventional induced superconductivity. Here the Josephson transport has been demonstrated to be ballistic^{8,10} and uniquely associated with the helical surface states^{16} which rules out a contribution from the disordered bulk^{8,10}. However, no other signatures have been observed. The reports on a skewed Josephson current phase relation could not be clearly discriminated if due to a conventional high transparency barrier in S3DTIS junctions^{17} or to the peculiar bound state spectrum of the surface helical metal^{11,14} possibly hosting Majorana fermions.
Our experiment is a decisive step along this line. We have realized hybrid devices based on a 3D TI, where the nanostructured morphology of the topological insulator flakes makes the measurement of the Josephson effect sensitive to the interface unconventional order parameter symmetry. By using the same path and notions previously employed to prove the dwave OP in high critical temperature superconductors^{18,19} (HTS) we have measured an unconventional magnetic field pattern of the Josephson current, with a dip at zero magnetic field. We demonstrate that this is the incontrovertible code of a Cooper pair tunneling process probing an OP with a nontrivial internal phase.
Results
Unconventional magnetic field patterns in AlBi_{2}Te_{3}Al Josephson junctions
Al3DTIAl Josephson junctions (Fig. 1a) have been realized using Bi_{2}Te_{3} flakes from epitaxial thin films. By varying the interface transparency D, from a value close to 1 to the tunneling limit (D ≪ 1) we have been able to show that the surface states of Bi_{2}Te_{3} host an induced OP with a non trivial phase compatible with a chiral pwave. Figure 1b shows the nanostructured morphology of the flakes. We observe characteristic pyramidal domains (see Methods section) with a prevailing single domain, which points towards thin films without twin boundaries^{20}.
Figure 1c shows the current voltage characteristic (IVC) of a typical junction at the first cool down, measured at base temperature of 20 mK in a dilution refrigerator. The curve presents 50% hysteresis and a large excess current I _{exc}, defined as the extrapolation at zero voltage of the IVC above the Al gap, Δ_{Al}. This value can be higher than the Josephson current for high transparent interfaces^{21} as we generally find for our devices. We will assume that the junctions can be assimilated to S′INIS′ structures where S′ is the effective fully gapped p + swave superconductor^{14}, N is the Bi_{2}Te_{3} Dirac metal channel and I the interface barrier (Fig. 1d). The induced gap in S′ will define the maximum I _{C} R _{N} product where I _{C} represents the maximum Josephson current and R _{N} the normal resistance of the junction. For the IVC of Fig. 1c, we get an I _{C} R _{N} ≈ 100 μV indicating an induced gap close to that of the Al^{22}. This is further supported by the high value of the transparency D we extract from the IVC. Specifically from the value \(eI_{{\mathrm{exc}}}R_{\mathrm{N}}/\Delta _{{\mathrm{S}}\prime }\) _{,} with \({\mathrm{\Delta }}_{{\mathrm{S}}\prime } \approx {\mathrm{\Delta }}_{{\mathrm{Al}}}\) _{,} we can extrapolate the value of the barrier transparency D ≅ 0.8^{21}.
Figure 2 shows the magnetic field dependence of the Josephson current for the same junction as in Fig. 1c. We observe an ideal Fraunhofer pattern with clear secondary lobes (cyan circles). From the modulation period \({\mathrm{\Delta }}B = \phi _0/A_{{\mathrm{eff}}} \approx 2.5\) mT, where ϕ _{0} is the superconducting flux quantum, we extract an effective area A _{eff} of 0.75 μm^{2}. This value is very close (within few %) to the numerically calculated effective area, by assuming a 2π periodic current phase relation (Supplementary Note 1). This has been verified for several junctions on various chips, which confirms a conventional magnetic field behavior of the devices in agreement with the theoretical predictions^{23} and various experimental reports^{24}, while in contrast with the anomalies stated in earlier works^{25}.
After thermal cycling (from base temperature to 300 K and back to base temperature) the transport properties of all devices undergo a dramatic change. The critical current of the junctions is, for most devices, reduced by more than two orders of magnitude (Fig. 2) while the normal resistance increased by a factor between 1.1 and 6 (Table 1).
We shall argue that this phenomenology is related to the dramatic role played by strain to tune the interquintuple layers interaction and therefore the topological phase in TIs. First principle calculations^{26,27} have shown that the consequence of a tensile strain (out of plane compression) is a shift of the Dirac point closer to the valence band while a compressive strain (out of plane expansion) leads to a gap opening at the Dirac point^{26}. Strain is usually generated during the epitaxial growth of the material on the substrate, with lattice parameters different from those of the topological insulator. Recent reports have shown the tunability of the Dirac point by strain in thin topological crystalline insulator SnTe^{28} and at grain boundaries in Bi_{2}Se_{3} thin films^{29}.
Our experiment is quite different: exfoliated Bi_{2}Te_{3} flakes are transferred to a SiO_{2}/Si substrate, so a possible strainrelated phenomenology cannot be attributed to the growth process. The strain instead is related to the huge difference in the thermal expansion coefficient of Bi_{2}Te_{3} (∼13.4 × 10^{−6} °C^{−1}) and that of the SiO_{2}/Si substrate (0.5 × 10^{−6} °C^{−1}/2.4 × 10^{−6} °C^{−1}). The flake will experience this difference by the clamping to the substrate, through the patterning of the Al electrodes forming a nanometer sized gap junction. During the warming up of the sample the Bi_{2}Te_{3} flake at the nanogap undergoes a compressive strain inducing plastic deformation that leads to a buckling of the Bi_{2}Te_{3} channel forming the nanogap upon a subsequent cool down^{30}. Figure 3 shows a SEM picture of a junction after cycling; a typical buckling feature appears in the nanogap (Supplementary Note 3).
Plastic deformations at the nanochannel can substantially affect the Josephson properties. The opening of a gap at the Dirac node, which can eventually reach the bulk gap^{26}, works as a tunneling barrier reducing the Josephson current as we observe in our experiment. The physics behind this reduction is that the opening of a gap at the Dirac node causes currentcarrying surface states beneath the Al electrodes to become evanescent waves in the TI nanogap region, which thus decay over a shorter distance than in the gapless case and thus reduces the critical current.
For the devices, which undergo the most dramatic changes in the Josephson current, the value of the I _{exc} is zero, signifying a very low transparency. However for these samples the most striking experimental observation is the inverted Josephson magnetic field pattern that appears after thermal cycling (Fig. 2 (blue points) and Fig. 4a, see also Supplementary Fig. 2, and Supplementary Note 2).
Discussion
Our results are consistent with a proximityinduced superconductivity in the TI surface states compatible with a p + s OP which contains a chiral pwave term. Let us now focus on the effect of the interface transparency on the chiral pwave part of the p + s OP. Selfconsistent calculations have shown that the transparency of the interface can have a dramatic effect on a chiral p _{ x } + ip _{ y } wave OP. For highly transparent interfaces, both the p _{ x } and p _{ y } component of OP gap are equally suppressed at the interface^{31} (Fig. 5a); however the net pairing symmetry of the order parameter remains a chiral pwave at the interface region, with a slightly reduced magnitude. As the interface transparency is lowered, the p _{ x } component of the order parameter will be strongly suppressed, while the p _{ y } slightly enhanced^{31,32} (Fig. 5b). Considering our data at the first cool down the transparency is high; if the induced order parameter is of the type p + s it will preserve the same symmetry at the interface. In this case, a Fraunhoferlike magnetic pattern is expected^{23}, as we have found in our experiment. After thermal cycling, however, the critical current is suppressed by orders of magnitude (Fig. 2). This fact cannot solely be attributed to a change in interface transparency due to plastic deformations induced by compressive strain (buckling). The strong suppression of I _{C} is, on the other hand, fully consistent with a change in pairing symmetry of the p + s OP. In particular, as theoretically predicted^{31,32} the chiral pwave term will assume a predominantly p _{ y }wave form at the interfaces (with the p _{ y } lobe parallel to the interface).
If one considers only the chiral term of the p + s OP its amplitude and phase at the S′IN interface are shown in Fig. 5c and 5d for a highly and low transparent interface respectively^{32}. The chiral p term, of the total OP, is mainly transformed in p _{ y } for low transparency barriers. Theory shows that in p _{ y }p _{ y } junctions the critical current becomes strongly suppressed even for a slight increase of scattering in the junction^{33}. This is therefore consistent with the observed reduction, of orders of magnitude in I _{C}, after thermal cycling. Secondly, such a change in pairing symmetry also explains the inversion of the Fraunhofer pattern with a dip at B = 0 when the S′IN interface transparency is lowered. For a predominantly p _{ y }wave OP at the interface, the occurrence of scattering in the normal region of the junction will couple quasiparticle trajectories, emerging from positive p _{ y } lobe of the OP on one side of the junction, with trajectories that probe the negative p _{ y } lobe on the other side of the junction. This corresponds to a net πphase shift in the Josephson coupling (Fig. 6a and b). Here it is worth pointing out that while the buckling wave in the nanogap area can partially be responsible for the reduction of the Josephson current (and possibly for a non homogenous distribution of J _{C} across the width of the junction) it cannot account for the peculiar dip of the Fraunhofer patter at B = 0, requiring a net πphase shift between the electrodes. While the above scenario provides a possible route for introducing 0 and πtrajectories in the system, we underline that an swave component of the OP simultaneously exists. We speculate that for πshifted trajectories to become possible, it might be of importance that the p _{ y }wave component is enhanced compared to the swave one since the p and swave condensates are not separated due to the spinmixing resulting from the normalstate TI dispersion with spin momentum locking.
In films with pronounced pyramidal nanodomains, like the flakes used in our experiment, the edges have proven to host an enhanced density of states^{34,35} and to be preferential trajectories^{36}. AharonovBohm oscillations in the magnetoresistance of thin films, where orbits around the triangle edges define the loop areas^{36} have been recently detected, demonstrating that the triangle’s corners and more in general stepedges work as scattering centers. To show that this effect is also observed in our Bi_{2}Te_{3} flakes we have measured the magnetotransport down to 20 mK temperatures. We observe clear periodic magnetoresistance oscillations, arising from coherent scattering of electron waves from the corners of the pyramidal domains and/or from the points where two domains merge, with a period corresponding to the morphology of the flake (Supplementary Note 4). In this scenario, among the quasiparticles crossing the Bi_{2}Te_{3} normal channel, the ones undergoing large scattering angles at the corners or stepedges of the pyramidal nanodomain, will probe a phase shift of π on the other side of the junction. The quasiparticles trajectories, instead, that do not undergo scattering events in the normal channel (e.g., coupling lobes of the same sign with each other) give a conventional 0 coupling. The schematics of the scattering processes are shown in Fig. 6b. The net result is that the total supercurrent is partially canceled by these competing contributions, which amounts to a suppressed I _{C} at zero field.
This simple explanation has also a direct microscopic analog in terms of Andreev levels mediated transport in a Josephson junction^{37}. Indeed a peculiarity of our measurement is the transition of the magnetic pattern to a conventional Fraunhofer type, for temperatures around 100 mK when the dip at zero field flattens out (Fig. 4b). This crossover has been theoretically predicted in the framework of low transparent Josephson junctions involving dwave HTS^{37,38}. The physics behind this phenomenology is connected to the presence of zero energy Andreev bound states, or mid gap states (MGS), characteristic of Josephson junctions with an OP with a nontrivial internal phase^{37}. For the case of Fig. 5b, the p _{ x } component, responsible of the MGS formation^{31}, is non zero on distances where Andreev reflection takes place^{37} (which are given by the coherence length in S′). Mid gap states are therefore formed on both sides of the junction and their resonant coupling gives an additional Josephson transport channel proportional to √D (instead of D as for conventional Andreev level mediated transport). When the MGS carrying current dominates at very low temperature^{37,38} and scattering events take place at triangle corners, the equilibrium phase difference of the system is at π, corresponding to a negative current. For straight quasiparticle trajectories the MGS current gives a conventional 0 phase character ground state.
Formally, this scenario is similar to artificially designed 0π ferromagnetic Josephson junctions where multiple connected segments are πshifted compared to each other^{39}. In this case, a similar inverted pattern is observed. The dip of the Josephson current at B = 0 is thus the proof of a superconducting order parameter with an internal phasestructure, which can cause either 0 or π couplings, precisely as seen in our setup (Supplementary Note 5).
In a generic junction, the contribution to the current is due to both the resonant MGS and the conventional Andreev bound states. At larger temperature the contributions of MGSs current cancels out since both MGSs carrying forward and backwards current are populated^{37} and therefore the conventional Andreev levels current will dominate. This leads to a peculiar π to 0 transition by increasing the temperature. Signatures of such a crossover have been reported in a superconducting quantum interference device (SQUID) geometry for dwave junctions^{40}. However those results were never confirmed, posing serious doubts on the effective possibility to detect a π−0 transition from the temperature dependence of the magnetic patterns. Our experiment is therefore one of the first demonstrations of Josephson transport mediated by MGS.
Clearly the dip at B = 0 in the magnetic pattern is also compatible with a \(d_{x^2  y^2}\) wave order parameter^{41}. We can rule out this possibility since the \(d_{x^2  y^2}\) OP does not change symmetry depending on the interface transparency^{37} and therefore cannot account for the dramatic modifications of the magnetic field response of the junctions upon thermal cycling. An helical p _{ x } + p _{ y } OP can instead be compatible with our entire experimental scenario. However, this OP symmetry does not come directly from the theoretical works^{1,14,41}, so the possibility to induce an helical p _{ x } + p _{ y } OP needs further theoretical assessment.
To further check the conjecture that stepedges and pyramidal corners act as scattering centers, we have fitted the temperature dependence of the critical current I _{C}(T) of the high transparency junctions. We consider that our S′INIS′ junction is characterized by insulating barriers with transparencies D _{1} and D _{2}, which are separated by a distance L ^{42}. The disorder in the normal channel is characterized by a mean free path l _{e}. As previously discussed, in case of high transparency barriers the junction behaves similarly to conventional swave junctions^{43}; in this case we do not lose generality by modeling the S′ superconductor with an swave OP. The Josephson current for an S′INIS′ junction in the clean limit l _{e}≫L has been derived in a previous work^{8}. To fit our data, we have modified the original result of ref. ^{8} in two ways (Supplementary Note 6): (i) by adapting it to the twodimensional Dirac character of the surface states, and (ii) by extending it into the regime l _{e} ≈ L which is achieved by changing the flight time expression of the electrons between the leads. We have verified that our approach well reproduces the Eilenberger theory for purely ballistic junctions and the Usadel theory for short diffusive junctions. Figure 7 shows the I _{C}(T) of the junction of Fig. 1c. The solid curve is the fit by considering the geometrical dimensions and l _{e} = 130 nm. The extracted value for the mean free path clearly supports our assumption that few scattering centers are present in the barrier and that some quasiparticles while crossing the TI channel will undergo a single scattering event. The value of the normalstate resistance extracted from the fit is higher than the experimental one, which can be explained by shunting effect of the bulk of the Bi_{2}Te_{3} ^{8} (Supplementary Note 6).
It is worth mentioning that we did not observe any apparent correlation between the orientation of the nanopyramidal domains and that of the electrodes. This is not surprising; the basic mechanism to get an inverted magnetic field pattern, is the occurrence of 0 and π trajectories within the nanogap and they can be obtained for whatever orientation of the triangles with respect of the electrode, provided that some of the corners and/or the points where two domains merge fall within the Bi_{2}Te_{3} nanogap (Supplementary Note 4).
Finally we would like to point out that magneto transport measurements (Supplementary Note 4) have clearly shown that scattering mechanisms, connected to the morphology of the Bi_{2}Te_{3} flakes, take place in the junction channel, which is instrumental to get π trajectories. However the interpretation of our measurements does not change if other scattering mechanisms are also involved.
To conclude it is worth discussing if the interpretation we have provided of our experiment would change if we would also consider a parallel Josephson contribution due to the transport through the bulk with an swave OP. Cooper pair transport through the bulk would just act as 0 trajectories effectively lifting the value of the Josephson current at zero external magnetic field, however leaving unaltered the dip structure at zero field of the magnetic pattern.
Methods
Materials and device fabrication
Bi_{2}Te_{3} thin films have been deposited by molecular beam epitaxy on a GaAs (100) substrate with a 2° vicinal cut. Prior to the growth, a 1 min Te soaking to the GaAs surface was carried out for passivation purpose. Then, the growth started at a temperature of 180 °C, when both Te and Bi sources were opened, and ended at a thickness of 80 nm after 1 h. The films have been grown with a high Te/Bi flux ratio, to obtain high quality crystallinity, as verified by Xray diffraction (XRD) analysis^{44}.
The films show characteristic aligned pyramidal domains (Fig. 1b). This morphology is different with respect to the growth on exact substrates, where two types of pyramidal domains rotated by 60° with respect to each other are observed^{20}. As verified by XRD analysis, our films show 86% single domain, which indicates that the vicinal cut in the substrate leads to suppression of twin boundaries, as also reported in literature^{20}. The transport properties have been characterized by magnetotransport measurements; the films show an effective surface carrier density of 4 × 10^{13} cm^{−2} and mobility above 2000 cm^{2} V^{−1} s^{−1} (at the temperature of T = 2 K).
Josephson junctions using Al electrodes have been realized by transferring the flakes on a Si/SiO_{2} substrate. To improve the adhesion with the Al electrodes a thin layer (3 nm) of Pt is deposited in situ on the surface of the flake, previously cleaned by a short (10 s) Ar^{+} ion milling^{45,46}.
Data availability
All relevant data are available from the authors.
Change history
30 January 2018
The original version of this Article contained an error in Fig. 6b. In the top scattering process, while the positioning of both arrows was correct, the colours were switched: the first arrow was red and the second arrow was blue, rather than the correct order of blue then red.
05 January 2018
The original version of this Article omitted the following from the Acknowledgements:
“This work was partly supported by the Research Council of Norway through its Centres of Excellence funding scheme, project number 262633, QuSpin.”
This has now been corrected in both the PDF and HTML versions of the article.
References
 1.
Fu, L. & Kane, C. L. Superconducting proximity effect and majorana fermions at the surface of a topological insulator. Phys. Rev. Lett. 100, 096407 (2008).
 2.
Beenakker, C. W. J. Search for Majorana fermions in superconductors. Annu. Rev. Condens. Matter Phys. 4, 113–136 (2013).
 3.
Alicea, J. New directions in the pursuit of Majorana fermions in solid state systems. Rep. Prog. Phys. 75, 076501 (2012).
 4.
Qi, X. L., Hughes, T. L., Raghu, S. & Zhang, S. C. Timereversalinvariant topological superconductors and superfluids in two and three dimensions. Phys. Rev. Lett. 102, 187001 (2009).
 5.
Hasan, M. Z. & Kane, C. L. Colloquium: topological insulators. Rev. Mod. Phys. 82, 3045–3067 (2010).
 6.
Qi, X.L., Witten, E. & Zhang, S.C. Axion topological field theory of topological superconductors. Phys. Rev. B 87, https://doi.org/10.1103/PhysRevB.87.134519 (2013).
 7.
Sacepe, B. et al. Gatetuned normal and superconducting transport at the surface of a topological insulator. Nat. Commun. 2, 575 (2011).
 8.
Veldhorst, M. et al. Josephson supercurrent through a topological insulator surface state. Nat. Mater. 11, 417–421 (2012).
 9.
Oostinga, J. B. et al. Josephson supercurrent through the topological surface states of strained Bulk HgTe. Phys. Rev. X 3, 021007 (2013).
 10.
Galletti, L. et al. Influence of topological edge states on the properties of Al/Bi2Se3/Al hybrid Josephson devices. Phys. Rev. B 89, 134512 (2014).
 11.
Kurter, C., Finck, A. D., Hor, Y. S. & Van Harlingen, D. J. Evidence for an anomalous currentphase relation in topological insulator Josephson junctions. Nat. Commun. 6, 7130 (2015).
 12.
Hart, S. et al. Induced superconductivity in the quantum spin Hall edge. Nat. Phys. 10, 638–643 (2014).
 13.
Pribiag, V. S. et al. Edgemode superconductivity in a twodimensional topological insulator. Nat. Nanotechnol. 10, 593–597 (2015).
 14.
Tkachov, G. & Hankiewicz, E. M. Helical Andreev bound states and superconducting Klein tunneling in topological insulator Josephson junctions. Phys. Rev. B 88, https://doi.org/10.1103/PhysRevB.88.075401 (2013).
 15.
Kallin, C. Chiral pwave order in Sr_{2}RuO_{4}. Rep. Prog. Phys. 75, 042501 (2012).
 16.
Cho, S. et al. Symmetry protected Josephson supercurrents in threedimensional topological insulators. Nat. Commun. 4, 1689 (2013).
 17.
Sochnikov, I. et al. Nonsinusoidal currentphase relationship in Josephson junctions from the 3D topological insulator HgTe. Phys. Rev. Lett. 114, 066801 (2015).
 18.
Van Harlingen, D. J. Phasesensitive tests of the symmetry of the pairing state in the hightemperature superconductors—Evidence for d_{x2−y2} symmetry. Rev. Mod. Phys. 67, 515–535 (1995).
 19.
Tsuei, C. C. & Kirtley, J. R. Pairing symmetry in cuprate superconductors. Rev. Mod. Phys. 72, 969–1016 (2000).
 20.
Tarakina, N. V. et al. Suppressing Twin Formation in Bi_{2}Se_{3}Thin Films. Adv. Mater. Interf. 1, 1400134 (2014).
 21.
Flensberg, K., Hansen, J. B. & Octavio, M. Subharmonic energygap structure in superconducting weak links. Phys. Rev. B 38, 8707–8711 (1988).
 22.
Abay, S. et al. Charge transport in InAs nanowire Josephson junctions. Phys. Rev. B 89, https://doi.org/10.1103/PhysRevB.89.214508 (2014).
 23.
Potter, A. C. & Fu, L. Anomalous supercurrent from Majorana states in topological insulator Josephson junctions. Phys. Rev. B 88, 121109, https://doi.org/10.1103/PhysRevB.88.121109 (2013).
 24.
Molenaar, C. G., Leusink, D. P., Wang, X. L. & Brinkman, A. Geometric dependence of NbBi_{2}Te_{3}Nb topological Josephson junction transport parameters. Supercond. Sci. Technol. 27, 104003 (2014).
 25.
Williams, J. R. et al. Unconventional Josephson effect in hybrid superconductortopological insulator devices. Phys. Rev. Lett. 109, 056803 (2012).
 26.
Liu, W. et al. Anisotropic interactions and straininduced topological phase transition in Sb_{2}Se_{3} and Bi_{2}Se_{3}. Phys. Rev. B 84, 245105 (2011).
 27.
Young, S. M. et al. Theoretical investigation of the evolution of the topological phase of Bi_{2}Se_{3} under mechanical strain. Phys. Rev. B 84, 085106 (2011).
 28.
Zeljkovic, I. et al. Strain engineering Dirac surface states in heteroepitaxial topological crystalline insulator thin films. Nat. Nanotechnol. 10, 849–853 (2015).
 29.
Liu, Y. et al. Tuning Dirac states by strain in the topological insulator Bi_{2}Se_{3}. Nat. Phys. 10, 294–299 (2014).
 30.
Bowden, N., Brittain, S., Evans, A. G., Hutchinson, J. W. & Whitesides, G. M. Spontaneous formation of ordered structures in thin films of metals supported on an elastomeric polymer. Nature 393, 146–149 (1998).
 31.
Tanuma, Y., Tanaka, Y. & Kashiwaya, S. Theory of the proximity effect at the interface of a normal metal and triplet pwave superconductor in the clean limit. Phys. Rev. B 74, 024506 (2006).
 32.
Matsumoto, M. & Sigrist, M. Quasiparticle states near the surface and the domain wall in apx±ipywave superconductor. J. Phys. Soc. Jpn. 68, 994–1007 (1999).
 33.
Asano, Y., Tanaka, Y., Yokoyama, T. & Kashiwaya, S. Josephson current through superconductor/diffusivenormalmetal/superconductor junctions: interference effects governed by pairing symmetry. Phys. Rev. B 74, 064507 (2006).
 34.
Alpichshev, Z., Analytis, J. G., Chu, J. H., Fisher, I. R. & Kapitulnik, A. STM imaging of a bound state along a step on the surface of the topological insulator Bi_{2}Te_{3}. Phys. Rev. B 84, 041104 (2011).
 35.
Liu, Y., Weinert, M. & Li, L. Spiral growth without dislocations: molecular beam epitaxy of the topological insulator Bi_{2}Se_{3} on epitaxial graphene/SiC (0001). Phys. Rev. Lett. 108, 115501 (2012).
 36.
Kandala, A., Richardella, A., Zhang, D., Flanagan, T. C. & Samarth, N. Surfacesensitive twodimensional magnetofingerprint in mesoscopic Bi2Se3 channels. Nano. Lett. 13, 2471–2476 (2013).
 37.
Lofwander, T., Shumeiko, V. S. & Wendin, G. Andreev bound states in highTc superconducting junctions. Supercond. Sci. Technol. 14, R53–R77 (2001).
 38.
Tanaka, Y. & Kashiwaya, S. Theory of Josephson effects in anisotropic superconductors. Phys. Rev. B 56, 892–912 (1997).
 39.
Weides, M. et al. 0pi Josephson tunnel junctions with ferromagnetic barrier. Phys. Rev. Lett. 97, 247001 (2006).
 40.
Testa, G. et al. Mid gap statebased πjunctions for digital applications. Appl. Phys. Lett. 85, 1202 (2004).
 41.
BlackSchaffer, A. M. & Balatsky, A. V. Proximityinduced unconventional superconductivity in topological insulators. Phys. Rev. B 87, https://doi.org/10.1103/PhysRevB.87.220506 (2013).
 42.
Galaktionov, A. V. & Zaikin, A. D. Quantum interference and supercurrent in multiplebarrier proximity structures. Phys. Rev. B 65, 184507 (2002).
 43.
Sawa, Y., Yokoyama, T., Tanaka, Y. & Golubov, A. A. Quasiclassical Green’s function theory of the Josephson effect in chiral pwave superconductor/diffusive normal metal/chiral pwave superconductor junctions. Phys. Rev. B 75, 134508 (2007).
 44.
Fülöp, A. et al. Phase transition of bismuth telluride thin films grown by MBE. Appl. Phys. Express 7, 045503 (2014).
 45.
Galletti, L. et al. Josephson effect in Al/Bi 2 Se 3/Al coplanar hybrid devices. Phyica C 503, 162–165 (2014).
 46.
Andzane, J. et al. Catalystfree vapour–solid technique for deposition of Bi2Te3 and Bi2Se3 nanowires/nanobelts with topological insulator properties. Nanoscale 7(38), 15935–15944 (2015).
Acknowledgements
The work has been supported by the Knut and Alice Wallenberg Foundation under the project “Dirac Materials.” We thank J. Kirtley, A. Leggett, S. Kubatkin, P. Lucignano, A. Tagliacozzo, M. Fogelström, M. Eschrig, P. Burset, V. Shumeiko, and A. BlackShaffer for inspiring discussions. This work was partly supported by the Research Council of Norway through its Centres of Excellence funding scheme, project number 262633, QuSpin.
Author information
Affiliations
Contributions
S.C. and L.G. have fabricated the samples and performed the measurements. S.W. and Y.S have grown the Bi_{2}Te_{3} thin films. D.G. and J.L. have contributed with theoretical insights and F.T. with discussions. G.K., E.O., A.K., R.A., and R.B. have performed morphological and structural characterizations of the devices. F.L. and T.B. have interpreted the measurements in collaboration with all authors. F.L has written the paper with inputs from all coworkers.
Corresponding author
Ethics declarations
Competing interests
The authors declare no competing financial interests.
Additional information
Publisher's note: Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.
Electronic supplementary material
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
Charpentier, S., Galletti, L., Kunakova, G. et al. Induced unconventional superconductivity on the surface states of Bi_{2}Te_{3} topological insulator. Nat Commun 8, 2019 (2017). https://doi.org/10.1038/s4146701702069z
Received:
Accepted:
Published:
Further reading

Josephson current mediated by ballistic topological states in Bi2Te2.3Se0.7 single nanocrystals
Communications Materials (2020)

Molecular beam epitaxy of superconducting PdTe2 films on topological insulator Bi2Te3
Science China Physics, Mechanics & Astronomy (2019)

Electronic transport in a twodimensional superlattice engineered via selfassembled nanostructures
npj 2D Materials and Applications (2018)
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.