Introduction

The phase diagram of the high temperature superconducting cuprates has been under extensive investigation since their discovery, nearly three decades ago1. In addition to superconductivity, a variety of ground states have been proposed and partly realized upon charge carrier doping. For example, the parent compound La2CuO4, which is an antiferromagnetic (AF) Mott insulator with Néel temperature TN = 325 K2, is known to exhibit a short-range glassy phase3,4,5,6,7 and subsequently diagonal stripe order upon doping with e.g. Sr (La2-xSrxCuO4)8,9,10. Recently, research has refocused on the highly underdoped cuprates11,12. However, the evolution of the electronic ground state with the very first added charge carriers, in particular in the search for a possible broken symmetry associated with an exotic ground state and the relevant consequences on the anomalous normal state properties remains unresolved.

Although earlier efforts had in fact suggested that ferroelectricity could be present in La2CuO4+x and YBa2Cu3O6+x,13,14 a low temperature ferroelectric (FE) phase with an associated magnetoelectric (ME) coupling was observed only recently in lightly oxygen doped La2CuO4+x (TN = 320 K)15. Ferroelectricity is characterized by broken spatial inversion symmetry and typically emerges in the absence of mobile charge carriers. In the case of lightly oxygen doped La2CuO4+x15 it was proposed that the non-stoichiometric oxygen ions occupy interstitial positions in the La2CuO4 unit cell, causing a displacement in the apical oxygen ions of the CuO6 octahedra, which are the building blocks of the La2CuO4 unit cell. Therefore, local-scale structural CuO6 distortions take place breaking spatial inversion symmetry and resulting in the formation of local electric dipoles16,17. These dipoles localize around the oxygen interstitials forming charge clusters, which couple and freeze at low temperature giving rise to a measurable polar state.

Other microscopic mechanisms have also been proposed. These include a model based on polaron formation around the dopant atoms18, a purely magnetic origin associated with Dzyaloshinskii-Moriya (DM) interaction leading to local structural distortions and concomitant local broken inversion symmetry19, a proposal for the emergence of electric polarization due to the formation of magnetic vortex/anti-vortex pairs at the edges of oriented stripe segments20 and a bound cluster model21,22. The presence of the ME effect in La2CuO4+x has also been studied by Landau theory, which includes a bi-quadratic coupling between the electric polarization and the magnetic order23,24. At present, there is no consensus on the origin of the FE phase in these materials. A central question is whether ferroelectricity is universal in these doped Mott insulators and for example, if it is present in La2CuO4 when different dopant ions are introduced into the lattice. To shed light on the nature of ferroelectricity and magnetoelectricity in the La2CuO4 system, it is important to study other members of the La-214 cuprate family, especially the case where charge carriers originate from Sr and Li doping. These ions occupy stoichiometric positions in the La-Cu-O unit cell and therefore, no dipole moments are directly associated with the dopant sites, in contrast to the case of interstitial excess oxygen ions in La2CuO4+x.

Here, we report measurements of the electric polarization on Sr and Li doped La2CuO4 single crystals. We show that La1.999Sr0.001CuO4+y exhibits distinct FE behavior along different crystallographic directions. A similar behavior is observed in lightly oxygen doped La2CuO4+x (these are different samples to those investigated in ref. 15) for direct comparison to La1.999Sr0.001CuO4+y. We find that the magnetic field dependence of the electric polarization is anisotropic and tunable through the DM interaction. In La2LixCu1-xO4 (x = 0.01 and x = 0.04), the measured electric polarization is in the μC cm−2 range i.e., several times higher than for La1.999Sr0.001CuO4+y and La2CuO4+x. Furthermore, the electric polarization in La2LixCu1-xO4 is tunable by an applied magnetic field in a manner similar to La1.999Sr0.001CuO4+y and La2CuO4+x. These results taken together demonstrate that the FE phase is present in all the underdoped La-214 cuprates we have investigated so far. We propose ferroelectricity may originate from a mechanism that breaks inversion symmetry by local structural distortions of the CuO6 octahedra, that is induced by the presence of the dopant ions and clustering of the added holes.

Results and Discussion

Figure 1a shows the in-plane dielectric permittivity ε′ab(T) for La1.999Sr0.001CuO4+y. At high temperatures, a step-like decrement is observed at all measured frequencies. This decrement shifts to higher temperature with increasing frequency f, indicative of a common dielectric relaxation process. At low frequencies, an additional dielectric peak develops which shifts to higher temperatures and is suppressed with increasing f. Such a peak in ε′ab may be either due to an intrinsic charge relaxor characterized by a diffused phase transition, or due to spurious effects arising from the electrical contacts, such as extrinsic Maxwell-Wagner effects25,26.

Figure 1
figure 1

In-plane dielectric permittivity for La1.999Sr0.001CuO4+y.

(a) ε′ab as a function of temperature (for various frequencies). (b) f vs. Tpeak graph as extracted from panel (a) (black solid circles). Green and red solid lines depict the Arrhenius and Vogel-Fulcher (VF) fits, respectively.

To clarify the intrinsic character of the dielectric peaks, ε′ab(T) measurements were repeated several times with renewed contacts giving consistent results in the temperature regime around the peaks. Furthermore, ε′ab(T) measurements were performed by varying the contact area as well as upon combined dc and ac electric fields25, showing no difference in the measured curves. Additionally, both the temperature where the dielectric peak occurs - Tpeak - and the magnitude of the permittivity at the peak position ε′peak support the intrinsic origin of ferroelectricity since they cannot be described by the empirical relations reported for a pseudo-FE relaxor15,25,26.

Figure 1b shows the f dependence of Tpeak as extracted directly from Fig. 1a. Our attempt to fit the experimental data using the Arrhenius relation (f = foexp [–Ea/kBT]) was unsuccessful. On the other hand, a relaxation process due to the slowing of polar clusters can be effectively described by the Vogel-Fulcher (VF) relation f = foexp [–Ea/kB(T - Tfr) ], where the characteristic freezing temperature Tfr corresponds to the temperature below which the polar clusters freeze27. Applying the VF relation we obtain Tfr-ab = (7.3 ± 0.3) K. Similar analysis of the out-of-plane dielectric permittivity ε′c gives a freezing temperature Tfr-c = (8.6 ± 0.5) K (supplementary S3), suggesting an anisotropic behavior in the charge dynamics, in agreement with an earlier report6. Furthermore, the excellent VF fit to the experimental data adds credence to the intrinsic character of the low temperature permittivity peaks – extrinsic effects would have been described by an Arrhenius law27,28. Thus, the above mentioned observation is likely due to a FE relaxor characterized by a diffused phase transition and the freezing of a short-range cluster-like order. In fact electric polarization may emerge below Tfr, in relaxor ferroelectrics29.

Figure 2a shows the in-plane, Pab(T) and the out-of-plane, Pc(T), electric polarization for La1.999Sr0.001CuO4+y. For both orientations, the polarization increases with decreasing temperature below 10 K. Notably, Pc and Pab exhibit distinct temperature dependences. Furthermore, corresponding as-measured pyroelectric current curves (Fig. 2a, inset) indicate the pyroelectric current local minima occur at different temperatures, namely at 4 K and 6.5 K for the in-plane and the out-of-plane orientations, respectively. A similar anisotropy has been observed in the spin-glass temperature9,30. Furthermore, the electric polarization curves reverse with reversing the polarity of the applied electric field, satisfying an essential condition for this phase to be described as ferroelectric.

Figure 2
figure 2

Electric polarization for La1.999Sr0.001CuO4+y.

(a) In-plane Pab (red line) and out-of-plane Pc (black line) electric polarization as a function of temperature. Inset. The corresponding pyroelectric current curves. (b) Polarization as a function of applied electric field (P-E) curves for Pab (red solid circles) and Pc (black solid circles) at 2 K. Blue and orange solid lines are guides to the eye.

In proper FE’s the onset of ferroelectricity is defined as the temperature above which there is no measurable polarization and the corresponding pyroelectric current exhibits a sharp minimum. On the other hand, in relaxor FE’s a transition occurs over a long time scale. Similarly in our data, the pyroelectric minimum is not sharp, resulting in a broad transition in the polarization with respect to temperature therefore, preventing a precise assignment of a transition temperature. We therefore assign the transition towards a FE state as the temperature where a minimum (albeit broad) occurs in the pyroelectric current. This assignment is corroborated by the fact that the temperature where the local minimum occurs is robust against both the electric field applied during cooling and the temperature sweep rate.

The electric polarization as a function of applied electric field (P - E curves) for both measured orientations is shown in Fig. 2b (T = 2 K). P changes with E, resulting in S-like P-E curves for both measured orientations. However, the out-of plane component exhibits higher P values than the in-plane counterpart (namely Pab = 18 nC cm−2 and Pc = 36 nC cm−2 at 2 K). In contrast, the in-plane component changes relatively smoothly with E. The above observation suggests a sizable anisotropy between in-plane and out-of-plane electric polarization, possibly linked to the anisotropy in the charge dynamics discussed earlier.

To confirm the different trends and elucidate the effect of Sr doping in La1.999Sr0.001CuO4+y (TN = 312 K) we performed electric polarization measurements on lightly oxygen-doped La2CuO4+x with TN = 313 K. Compared to our previous studies15, the La2CuO4+x samples investigated here exhibit a lower TN, indicative of a higher excess oxygen concentration and therefore, higher charge carrier concentration. Approximate estimates of the excess oxygen and carrier concentration for the La2CuO4+x samples studied here are 0.40 ± 0.08 mol% and ~10 18cm−3, respectively31, which are significantly lower than corresponding values in ref. 15. Similarly, for La1.999Sr0.001CuO4+y we obtain n ~ 1018 cm−3 and 0.43 ± 0.08 mol%. Notably, the Sr doping level is sufficiently low to affect the Néel transition, thus the suppression of TN is likely due to excess oxygen32,33.

Figure 3a shows the temperature dependence of Pab and Pc for La2CuO4+x (TN = 313 K). Both Pab and Pc increase with decreasing temperature however, Pc exhibits a distinct temperature dependence compared to Pab(T). Namely, a change in slope is observed at 5 K and 3 K for the out-of-plane and the in-plane orientation, respectively. (These temperatures differ to those for the La2CuO4+x samples reported in ref. 15 where TFE = 4.5 K for both the in-plane and-out of plane directions. Notably, the anisotropy is reduced with increasing the Neel temperature, as shown for the electric conductivity and the dielectric constant34,35). At T = 2 K, Pc is almost equal to Pab. However, Pc reverses almost immediately with reversing the electric field (E) and saturates at low fields (Fig. 3b). On the other hand, Pab increases gradually with E showing an S-like behavior and tends to saturate at high values of E. This trend is qualitatively similar to the behavior observed in La1.999Sr0.001CuO4+y, indicating that anisotropy is an intrinsic property of the system. Comparison between La2CuO4+x and La1.999Sr0.001CuO4+y, reveals distinct differences in the dielectric permittivity, FE transition temperatures and anisotropy (supplementary table ST1). We also measured La1.998Sr0.002CuO4+y however, the material was not sufficiently insulating to permit transport measurements of the electric polarization. Hence, although possible excess oxygen may still affect our observations in La1.999Sr0.001CuO4+y, the above results indicate Sr doping influences the FE behavior of La2CuO4+x and is distinct from oxygen doping.

Figure 3
figure 3

Electric polarization for La2CuO4+x (TN = 313 K).

(a) In-plane Pab (red line) and out-of-plane Pc (black line) electric polarization as a function of temperature. (b) Polarization as a function of applied electric field (P-E) for Pab (red symbols) and Pc (black symbols) at 2 K. Dark green and blue lines are guides to the eye.

We now turn to the effect of the applied magnetic field. The spins in the AF phase of La-214 are weakly canted out-of-plane due to the presence of a finite DM interaction36. Spin canting causes a weak ferromagnetic (WF) moment along the c-axis in each CuO2 plane, although the opposite spin canting in alternate planes leads to a net cancellation of the WF moments. By applying an external magnetic field along the c-axis, the WF moments can be aligned in the same direction above a critical magnetic field Hcr, which for La1.999Sr0.001CuO4+y is 6 T (supplementary S5).

Figure 4a shows Pc (E||c) as a function of applied magnetic field (H||c). Pc decreases abruptly above Hcr = 6 T. Furthermore, the temperature where the pyroelectric current minimum occurs - Tmin (Fig. 4b) - exhibits a strong decrease above Hcr, indicating a suppression in the onset of FE as the material enters the WF state (similar changes are also observed for H||c and E^c). On the other hand, Pab (E||ab) decreases progressively with increasing H||ab (Fig. 4c), while Tmin shifts smoothly to lower temperatures with increasing H (Fig. 4d - similar changes are observed for E^ab and H||ab). Hence, ferroelectricity in La1.999Sr0.001CuO4+y is coupled to the underlying AF structure and is influenced by the DM interaction in a manner similar to recent observations for La2CuO4+x15,23,24.

Figure 4
figure 4

Magnetoelectric coupling in La1.999Sr0.001CuO4+y.

(a) Pc(H)/Pc(0) vs. H at T = 2 K (H||c and E||c). The black dashed line depicts the critical magnetic field above which the sample enters the WF state (light blue region). (b) Tmin vs. H curve. Solid black symbols correspond the temperatures where the pyrocurrent minima occur for each magnetic field (inset graph). Red solid line is a guide to the eye. (c) Pab (H)/Pab (0) vs. H, at T = 2 K (H||ab and E||ab). (d) Tmin vs. H graph. Solid blue symbols correspond the temperatures where the pyrocurrent minima occur for each magnetic field (inset graph). Red solid line is a guide to the eye.

The similarity in the measured FE state among La2CuO4+x and La1.999Sr0.001CuO4+y cuprates is notable even though oxygen and Sr doping do not affect the CuO6 structure in the same way - the excess oxygen take non-stoichiometric positions, while Sr ions substitute for La - suggesting a common origin of ferroelectricity in these materials. Because Sr and oxygen dopants take positions outside the oxygen octahedra, it is important to study the evolution of ferroelectricity in the La-214 family of cuprates using also Li doping, which directly replaces Cu ions in the CuO6 octahedra. Among other dopants, such as Mg and Zn which can be used to replace Cu, Li ions exhibit the largest ionic radius (0.76 Å) compared to 0.74 Å for Zn, 0.72 Å for Mg and 0.73 Å for Cu. Furthermore, La2LixCu1-xO4 remains insulating for Li doping up to 4%37,38, allowing pyrocurrent measurements even at relatively high carrier concentration.

Figure 5a shows the temperature dependence of Pc for La2LixCu1-xO4 (x = 0.01 and x = 0.04). In both cases Pc increases with decreasing temperature, below ~9 K. A change in slope in the electric polarization occurs at 5 K for x = 0.01 and at 3.5 K for x = 0.04. These temperatures are also comparable to the values of charge cluster freezing temperatures reported by Park et al.39 suggesting a link between charge glassines and the onset of ferroelectricity in La-214 cuprates. The corresponding P-E curves (Fig. 5b-5c) reveal a behavior similar to that observed in La1.999Sr0.001CuO4+y and La2CuO4+x. Furthermore, the polarization is remarkably large namely, 900 nC cm−2 for x = 0.01 and 800 nC cm−2 for x = 0.04. However, for the in-plane orientation, ac conductivity analysis reveals a dominant in-plane electrical conductivity in the low temperature regime preventing the measurement of pyroelectricity6.

Figure 5
figure 5

Electric polarization for La2LixCu1-xO4.

(a) Pc as a function of temperature for La2LixCu1-xO4 with x = 0.01 (black solid line) and x = 0.04 (blue solid line). P-E curves for (b) x = 0.01 and (c) x = 0.04 at 2 K are also shown. Red and blue solid lines are guides to the eye.

Figure 6 shows the magnetic field dependence of Pc for La2LixCu1-xO4 (x = 0.01 and x = 0.04) at T = 2 K (E||c and H||c). For x = 0.01, Pc is enhanced below Hcr = 6.5 T, increasing almost 1.7 times its zero-field value (Fig. 6a) before being suppressed. It has been suggested this may be due to a DM induced magnetoelectric coupling23,24. For x = 0.04 (Hcr = 4 T) Pc is roughly constant up to Hcr, while it decreases when a WF state sets in (Fig. 6b). Moreover, Tmin decreases above Hcr for both samples, similar to La1.999Sr0.001CuO4+y. Therefore, La2LixCu1-xO4 behaves qualitatively similar to La1.999Sr0.001CuO4+y and La2CuO4+x indicating ferroelectricity is a common ground state in the La-214 cuprates studied so far, with an associated magnetoelectricity tunable by DM interaction.

Figure 6
figure 6

Magnetoelectric coupling in La2LixCu1-xO4.

Effect of the applied magnetic field to the electric polarization (a) for La2Li0.01Cu0.99O4 and (b) for La2Li0.04Cu0.96O4, respectively. In both cases T = 2 K, H||c and E||c. Tmin vs. H is also demonstrated in correspondence to the electric polarization. The black dashed line indicates the critical field above which the samples enter the WF state (light blue region). Red and orange solid lines are guides to the eye.

According to the scenario proposed earlier, in La2CuO4+x charge clusters may give rise to ferroelectricity15,23,24. However, as mentioned above, Sr and Li dopant ions occupy stoichiometric positions in the La-Cu-O unit cell and therefore, no dipole moments are directly associated with the dopant sites, in contrast to the case of interstitial excess oxygen ions in La2CuO4+x. Although we cannot rule out alternative mechanisms for the emergence of ferroelectricity, here we propose that ferroelectricity could emerge from charge clustering together with CuO6 distortions21,22 induced by dopant ions. In particular, it has been shown22 that charges of dopant ions and apex oxygen atoms are combined with many-body screening effects and bind clusters of four holes. The asymmetrically distributed charge clusters break inversion symmetry locally and form randomly distributed dipoles at high temperatures. Below a temperature that depends upon the size and density of the dipolar clusters, these randomly oriented dipoles begin to align in different regions within the sample into a long range FE state. Note that the cluster size usually depends on doping21 and the clusters evolve anisotropically first along the ab-plane and then slowly along the c-axis. The observation of a P - E response in both measured directions for Sr and oxygen doped samples, adds credence to the presence of dipolar clusters with different directional orders. This scenario has similarities with the model proposed by Daoud-Aladine et al.40 and by D. V. Efremov et al.41, which could also be applied to non-metallic cuprates. In particular, a local charge ordering pattern such as formation of Zener polarons could lead to a locally broken inversion symmetry state. The phase diagram of high-Tc cuprates is known to contain both site- and bond- centered charge ordered states41 and they could potentially survive within short range charge clusters at lower doping levels.

In support of the above proposed scenario21,22, theoretical and experimental evidence for both Sr and oxygen-doped La2CuO4 indicate the presence of local octahedral distortions correlated to charge inhomogeneities42,43,44,45,46,47. Cordero et al. reported the development of a significant tilt mode associated with oxygen octahedral distortion below T = 10 K from anelastic spectroscopy measurements on nearly undoped La2-xSrxCuO4 crystals17. It was argued that these tilt modes are due to fluctuating low temperature tetragonal structures at domain walls of the low temperature orthorhombic lattice and are coupled to hole clusters. Additionally, a non-centrosymmetric monoclinic distortion in the CuO6 octahedra in orthorhombic La2-xSrxCuO4 and La2CuO4+x has also been observed16. Notably, ferroelectricity sets in when transitions from centrosymmetric to non-centrosymmetric phases occur e.g. BaTiO3 undergoes a cubic (centrosymmetric) to tetragonal (non-centrosymmetric) phase transition at 120 oC resulting to the onset of ferroelectricity below this temperature. The presence of non-centrosymmetric octahedral distortions in orthorhombic La2-xSrxCuO4 and La2CuO4+x may therefore explain the quantitatively similar polar behavior observed in these materials.

In the case of Li-doped La2CuO4 the polar behavior may also be associated to the local-scale distortions combined with charge clustering. Li atoms are located at the center of the CuO6 octahedra resulting to an increase in the distance between Li ions and the apical oxygen atoms38 and a corresponding tetragonal distortion42 (notably, tetragonal structures can be non-centrosymmetric or polar in some cases47). Moreover, the apical oxygen movement induces a correlated displacement of the bonded La atoms, giving rise to distortions which could locally destroy the spatial symmetry. We note however, further investigation is necessary to narrow down the possibilities for the physical mechanism driving our observations15,18,19,20,21,22,23,24.

In summary, we report evidence for the presence of FE and ME coupling in underdoped La-214 cuprates, namely La2CuO4+x, La1.999Sr0.001CuO4+y and La2LixCu1-xO4 (x = 0.01 and x = 0.04). For both Sr and oxygen doped samples we observed distinct electric polarization behavior along the in-plane and out-of-plane crystallographic orientations. In all cases the electric polarization is strongly influenced by DM interaction. For Li-doped samples electric polarization values of the order of μC cm−2 are obtained. Considering the above experimental evidence, the FE order and its related magnetoelectricity appear to be a generic property of La-214 cuprates.

Methods

Crystal growth

The experiments were performed on twinned single crystals. La1.999Sr0.001CuO4+y crystals were grown using the laser-diode heated floating zone method48. High purity La2O3 (99.99%), SrCO3 (99.9%) and CuO (99.9%) were used as starting materials. Sr ions take La stoichiometric positions and thus the Sr concentration (x = 0.001) is higher than the purity of La2CO3. On the other hand, the Sr concentration is comparable to the purity of CuO. Furthermore, the crystals were carefully annealed at 1000 oC for 20 h under 1 ppm O2 - Ar flowing atmosphere. The crystal axes were determined using the x-ray Laue backscattering technique. The sharp antiferromagnetic transition at 312 K (see supplementary section S1) is suggestive of homogeneous distribution of the dopant ions (either Sr or excess oxygen ions) in La1.999Sr0.001CuO4 since an inhomogeneous distribution would cause either the suppression, broadening of the AF peak at 312 K, or the presence of secondary magnetic peaks below 312 K. To overcome the difficulty in quantifying experimentally the very low Sr concentration, we synthesized (crystal growth and annealing) oxygen doped La2CuO4+x using the same method as for La1.999Sr0.001CuO4+y. The agreement in the magnetic transition (supplementary S1) indicates a similar excess oxygen doping in both materials; very small Sr doping is not expected to influence the magnetic transition temperature of La1.999Sr0.001CuO4+y32,33. Therefore, a possible difference in the transport properties between La2CuO4+x and La1.999Sr0.001CuO4+y would be due to Sr doping. La2Cu1-xLixO4 single crystals were grown using the conventional Lamp Heated Floating Zone Technique37. High purity La2O3 (99.999%), Li2CO3 (99.99%) and CuO (99.99%) were used as starting materials to achieve the lowest possible impurity level. The crystal axes were again determined by the x-ray Laue backscattering technique. The samples were annealed at 900 oC for 48 h in flowing Ar atmosphere. The Li concentration was estimated from x-ray diffraction measurements of the lattice constants38. All crystals were cut appropriately and pairs of plate-like samples were extracted. Each pair consists of a sample with the thinnest direction along the c-axis and another with the thinnest direction along the ab-plane.

Magnetic measurements

The magnetization of the samples was measured using a commercial MPMS Quantum Design SQUID magnetometer, in Heraklion. The La1.999Sr0.001CuO4+y crystals exhibit TN = 312 K, whereas for LaCuO4+x TN = 313 K. For La2LixCu1-xO4 crystals, TN = 255 K (x =  0.01) and TN = 150 K (x = 0.04).

Impedance and pyroelectric measurements

The impedance and loss of the samples were measured using an LCR meter in the frequency range 21 Hz – 2 MHz. The dielectric permittivity was extracted as described elsewhere6. Electric polarization measurements were performed using two different home-built experimental stations in Heraklion and Singapore employing the pyrocurrent technique. To measure accurately the electric polarization of our samples we employ the following protocol. The measurement process begins with the sample well above its FE transition temperature (paraelectric state). An electric field is applied and the sample is cooled to 2 K. The electric field is then removed to fulfill the conditions described earlier. The sample is then heated at 3 K/min. During this process, time, temperature and current are measured at a constant interval of 0.5 seconds. The sample is heated to well above its FE transition temperature. In the case of measuring the pyrocurrent in the presence of an applied magnetic field, we apply the magnetic field as soon as the sample reaches 2 K and before removing the applied electric field (Zero Magnetic Field Cooling). Finally, the P vs. E curves are obtained by measuring the pyroelectric current as a function of temperature, for various applied electric voltages. Further information regarding the pyrocurrent data processing can be found in the supplementary (section S2).

Additional Information

How to cite this article: Viskadourakis, Z. et al. Ferroelectricity in underdoped La-based cuprates. Sci. Rep. 5, 15268; doi: 10.1038/srep15268 (2015).