Introduction

The world’s energy demands require more efficient methods of producing, storing, transmitting and using clean energy, such as electricity. Superconductors can help address all of these areas with more efficient generators/wind turbine generators, magnetic energy storage devices, power transmission lines, electric motors and so on. One key for these applications is to develop materials such as superconductor, photoelectric and thermoelectric materials that enable alternative energy ‘ecosystems’. For all of these material types, it is necessary to find industrially compatible ways to fabricate high-performance material. The method of nanocomposite inclusion in different perovskite materials is highly effective. Superconductive/thermoelectric material performance can be improved by adding nanoparticles (NPs) that disrupt the order parameter/phonon density while leaving the matrix and electronic structure of the superconductor/thermoelectric intact.1, 2, 3, 4 In the case of thermoelectrics, the reduction of lattice thermal conductivity through phonon scattering by size-controlled NPs has been predicted in the seminal paper by Hicks and Dresselhaus.5 This approach has already been demonstrated to be effective in metallic materials, such as Bi2Te3/Sb2Te3 multilayers6 and PbTe bulk material1 with natural NP additions with a significant enhancement of the figure of merit (ZT) that has reached up to ~2 at 800 K. In comparison with metallic materials, oxides offer the advantages of reduced cost, nontoxicity and higher stability at high temperatures. Impressive performance using a nanoengineering approach has been obtained in SrTiO3 multilayers with added Nb nanoparticles.7 Thin films oxides, such as hexagonal Al-ZnO,8 perovskite RE2-xCexCuO4 (RE214)2, 9 and RE-doped Sr3Ti2O7,10 have already demonstrated excellent thermoelectric properties even without the addition of NPs. Other materials, such as transparent delafossite CuAlO2,11 have the potential to be used as thermoelectrics. The paradigm of insertion and control of artificial NPs in high-Tc superconductors can be easily transferred to all of these other oxides to prepare efficient, environmentally friendly thermoelectric harvesters. It is also crucial to achieve this in a scalable, high-throughput (that is, economical) way. Metal organic deposition (MOD) fulfills all of these requirements; thus, finding ways to tailor the size and density of NPs while ensuring that the underlying matrix remains as pristine as possible is a goal that has been pursued for decades.

After the seminal works demonstrated that second-phase additions4, 12 to RE-Ba-Cu-O (rare earth (RE)) (REBCO) thin films grown using pulsed laser deposition (PLD) significantly improved the current carrying performance in an applied magnetic field,3, 13, 14, 15 it was shown that the morphology of the inclusions depends on the synthesis method (that is, in situ vs ex situ).3, 16 Moreover, recent work has shown that large quantities (10%) of second-phase additions are required to obtain the desired level of performance in superconductors.17, 18, 19 Until now, such a large amount of second phase resulted in current blocking and the loss of crystallinity.19, 20

For REBCO superconductors, MOD has been shown to be amenable for growing extremely high performance materials21, 22, 23, 24, 25, 26 with high throughput;27, 28, 29 however, the tailoring of NP inclusions is extremely difficult.30 Unlike PLD, the formation of NPs during MOD occurs before matrix formation; therefore, the NP size is not determined by crystalline strain but by diffusion, leaving little room for tailoring particle size compared with that of in situ processes, where growth dynamics affect the nanoparticle/nanorod morphology.31, 32 Because the REBCO crystallization process in MOD is liquid mediated, the nanoparticle–matrix interphase is incoherent; thus, the matrix crystalline quality is less affected (than for PLD), allowing for higher NP densities.

Here, we report a new strategy to tailor an ultra-high density of tunable-size, incoherent-interfaced BaHfO3 (BHO) NPs that result in enhanced properties for perovskite-composite cuprate superconductor (Y0.77Gd0.23)Ba2Cu3Oy ((Y,Gd)BCO) films. This strategy limits the growth of second-phase NPs by reducing diffusion during formation and produces an Hf- and Ba-poor layer by using multiple MOD coating/calcination steps. The high density of BHO NPs results in virtually no degradation of the matrix crystallinity as evidenced by the further improved superconducting properties. Critical current density Jc(θ,H,T) measurements demonstrate that the NPs are highly effective as pinning centers by decreasing vortex motion and depinning fluctuation effects for all magnetic field strengths and orientations. Furthermore, we present a simple pinning model that predicts the superconductor performance with NPs for any temperature and magnetic field using only a small set of fixed parameters. Our synthesis method can be directly applied to other perovskite-composite materials to improve their functionality.

Materials and methods

(Y0.77Gd0.23)Ba2Cu3Oy films with a high density of NPs

HTS wires based on epitaxially grown REBCO nanocomposite films of standard (Y,Gd)BCO and BMO NP-doped films were grown from metal organic solutions that included Y-, Gd-, Ba-trifluoroacetates, and Cu-naphthenate with a cation ratio of 0.77:0.23:1.5:3 on buffered tapes of CeO2 (grain-boundary angles, Δφ=3.0°)/Y2O3/LaMnO3/ion-beam-assisted deposition-MgO/Gd2Zr2O7/Hastelloy C276 (Haynes International Inc., Kokomo, IN, USA). We added M-naphthenate (M=Zr, Nb, Sn or Hf) into the (Y, Gd)BCO solutions; the volume percent of BaZrO3 (BZO) was 4–28%, and the concentration of the starting solution was 1.2 mol l−1 for dcoat=150 nm films. For dcoat=30 nm films, the concentration of the starting solution was 0.45 mol l−1. The coated film was thermally decomposed to an amorphous phase precursor by heating up to 500 °C at a heating rate of 5 °C min−1 in a humid oxygen atmosphere (P(H2O)=3.2 kPa with an inlet temperature of the humid oxygen gas of 300 °C). The number of coating/calcination cycles to obtain the final film thickness of 0.6 μm was 4 and 20 for the dcoat=150 nm and dcoat=30 nm films, respectively. The calcined film was heated up to 740 °C at 20 °C min−1 and held for 80 min in a humid oxygen gas environment for crystallization and conversion to the REBCO phase material. The total thickness of the superconductive layer for all samples was 0.6 μm, confirmed by cross-sectional transmission electron microscopy (TEM). Additional details of the calcinations and conversion steps have been published elsewhere.30

Transport properties in magnetic fields

Films were patterned using photolithography and ion milled into bridges with widths of ~50 μm. The crystalline quality was examined by X-ray diffraction. The temperature dependence of the resistivity (ρ) was measured by a four-probe method in the temperature range of 10–300 K using a Physical Property Measurement System (PPMS, Quantum Design, Inc., San Diego, CA, USA) with a superconducting magnet generating a field H of up to 9 T. In the PPMS, a rotational stage was used to rotate the samples with respect to H. The critical current was determined using a 1 μV cm−1 criterion.

Microstructure and chemical composition analysis

The samples were thinned by Ga ions at an accelerating voltage ranging from 40 to 2 kV in a focused ion beam scanning electron microscopy dual-beam system (NB5000, Hitachi High-Technologies Co., Tokyo, Japan) equipped with a microsampling system to prepare cross-sectional and plan-view TEM specimens. The focused ion beam damaged layers formed on the TEM specimens were removed using an Ar ion beam at an accelerating voltage of 1 kV in a PIPS39 Model 691 (Gatan, Inc. Pleasanton, CA, USA). The microstructure and local chemical composition of the specimens were investigated using a EM-002BF and a JEM-2100F (Topcon Co., Tokyo, Japan) with an aberration-corrected scanning system at an accelerating voltage of 200 kV. Energy-dispersive X-ray spectroscopy elemental maps were acquired by a Noran System Seven (Hitachi High-Technologies Co.) with twin energy-dispersive X-ray spectroscopy detectors in a microscope (Topcon Co., Tokyo, Japan).

Results and discussion

Routes to tune the nanoparticle size in MOD films

Superconductor films (Y,Gd)BCO are grown on metallic substrates using MOD. As described in Figure 1a, the standard MOD process consists of coatings, calcinations and crystallization. Early in the temperature ramp of the crystallization, BaMO3 (BMO, M=Zr, Nb or Sn) NPs are formed before the crystalline growth of the matrix, resulting in randomly distributed and oriented NPs.21, 33 Previously, we demonstrated that by changing M in BMO, we could control the NP size from 22 to 83 nm30 but did not determine the mechanism behind the different NP sizes.

Figure 1
figure 1

Metal organic deposition (MOD) process and cross-sectional microstructure of calcined and crystallized (Y,Gd)BCO+12BHO films. (a) Schematic of the MOD process for fabrication of BaMO3 (BMO) nanoparticle (NP)-doped (Y,Gd)BCO films. (1) Coating a chemical solution; (2) calcination to obtain a precursor containing several amorphous phases; and (3) crystallization of the superconducting phase. Cross-sectional high-angle annular dark-field (HAADF) images and compositional line analyses of Hf, Ba and Cu for the calcined films in +12BHO film with (b) dcoat=150 and (c) 30 nm, respectively. The horizontal axis indicates the distance from the CeO2 buffer layer. (d) Elemental maps of Hf and (e) cross-sectional scanning transmission electron microscopy (STEM) image for the +12BHO (dcoat=30 nm) film. The horizontal bar scale indicates 20 nm for both (d, e). In (e), BaHfO3 (BHO) nanoparticles are color-coded by size. The horizontal arrows in (e) indicate stacking faults observed around the nanoparticles. (f) Histograms showing the distribution of diameters of BHO NPs for +12BHO films with dcoat=150 and 30 nm. The colors correspond to those in (e).

In this paper, we present a new process that limits NP growth by creating Ba- and M-poor regions leveraged by even smaller NPs using M=Hf. These regions appear at the interface between coatings that thus reduces the precursor thickness (dcoat) and produces smaller NPs. The BHO NP-doped films were grown from 4, 8 and 12 vol.% BHO-doped MOD solutions. Figures 1b and c show the cross-sectional high-angle annular dark-field images and the compositional line analysis results of the calcined films quenched after multiple coating/calcination steps with different dcoat values for 12 vol.% BHO additions. To obtain a film total thickness of 0.6 μm, the number of coating/calcination cycles required was 4 and 20 for the dcoat=150 nm and dcoat=30 nm films, respectively. The thickness profiles of the layer composition are uniform up to a height (duniform, proportional to dcoat) above which the layer is Cu rich and Ba and Hf poor. A cross-sectional Hf elemental map and a TEM image for a 12 vol.% BHO-doped (Y,Gd)BCO with dcoat=30 nm (+12BHO (dcoat=30 nm)) is shown in Figures 1d and e, respectively, showing the presence of uniformly dispersed NPs. Figure 1f shows the particle-size distribution extracted from several planar (not shown) and cross-sectional scanning TEM images. Films with dcoat=150 nm have a broad NP distribution with an average size of 17±5 nm. However, for dcoat=30 nm, the distribution is much sharper with an average NP size of 7±3 nm, an average NP spacing of LNP ~20 nm and a density of nnp ~8 × 1022 m−3. The Ba- and Hf-poor regions act as barriers to NP coarsening because elements diffuse and NPs nucleate and grow in the beginning of crystallization; a thicker duniform allows for additional coarsening of the NPs (essentially semi-infinite diffusion), yielding larger particles and a wider size distribution compared with less diffusion, smaller size and a narrower distribution for smaller duniform values.

In Figure 2a, we show the dependence of nnp on the vol.% and dopant material in (Y,Gd)BCO films. Here, nnp varies systematically with M and increases for smaller dcoat values. The nnp of +12BHO films increased by a factor of 2 between dcoat=150 and 30 nm. The increase of nnp between dcoat=150 and 30 nm for +12BZO films is a factor 1.5. Similar behavior between BHO and BZO additions indicates that the technique is general and can be applied to control the BMO NP size in perovskite-composite materials. The NP size also depends on M(=Nb, Sn, Zr and Hf) that ranges from 83 nm for BaNbO3 (BNO)30 down to 17 nm for BaHfO3 in 4 vol.% doped (Y,Gd)BCO with dcoat=150 nm. Although a similar dependence on size of BMO nanorods (NRs) is observed in PLD films,34 the size-determination mechanisms are not necessarily the same because the growth mechanisms are clearly different. The BMO NRs in PLD grow with the REBCO phase in the same growing interface, and therefore the growth of each phase is strongly influenced by the other phase35 (coherent interfaces). On the other hand, BMO NPs in MOD freely nucleate and grow in the precursors before the growth of the REBCO phase (incoherent interfaces). Nevertheless, diffusion plays a dominant role for NP formation. From X-ray diffraction patterns of films quenched at different temperatures during crystallization, we observed the BMO formation temperature TBMO to be ~740, ~720, ~700 and ~630 °C for BNO, BaSnO3, BZO and BHO, respectively, indicating a clear correlation between a lower TBMO and a smaller NP size. Our findings indicate that the formation temperature, which dictates diffusion, provides another route to tune the NP size.

Figure 2
figure 2

Nanoparticle (NP) density and self-field Jc as a function of vol.% of addition for (Y,Gd)BCO+BMO films. (a) BaMO3 (BMO) NP density as a function of volume percent of addition for (Y,Gd)BCO+BMO films obtained from several transmission electron microscopy (TEM) images. Open and solid symbols represent data of films with dcoat=150 and 30 nm, respectively. (b) Jcs.f. at 77 K as a function of volume percent of addition for (Y,Gd)BCO+BMO films. Inset: Jcs.f. at 77 K versus NP density for films with 12 vol.% of different dopants.

Figure 2b shows the self-field Jc (Jcs.f.) as a function of vol.% of addition. In particular, no decrease in Jcs.f. with BHO additions (dcoat=30 nm) is found. The inset in Figure 2b shows Jcs.f. initially increasing linearly with nnp, consistent with single vortex strong pinning36, 37 by NPs. The Jcs.f. decrease for the BNO, BaSnO3 and BZO films (>10 vol.%), which is related to the coarsening and interconnection of NPs, is also evidenced by the sublinearity of nnp-vol.%. These results highlight the importance of the choice of dopant material to both tune the density and control size to obtain the desired performance.

Incoherent fine NP in MOD films

Part of the successful addition of NPs in MOD can be found in Figure 3 by comparing the structural and superconducting properties for inclusions with coherent and incoherent interfaces, that is, coherent NRs in films grown using a low-temperature growth technique via PLD (PLD-BHO-NRs),20 coherent nanoparticles (PLD-Y2O3-NPs)38 and incoherent nanoparticles (MOD-BHO-NPs (dcoat=30 nm)). For both PLD films, the c-axis length of the superconducting matrix lattice expands markedly with increasing vol.% but, in contrast, remains flat for MOD-BHO-NPs. Similarly, a negative trend with vol.% is observed in Tc and Jcs.f. for PLD films, whereas for MOD-BHO-NPs, Tc is constant and Jcs.f. increases. The trends of the c-axis expansion and Tc decrease in PLD films are consistent with oxygen-deficient regions surrounding the inclusions.39 High-resolution plan-view images and geometrical phase analysis (Figures 3d and e) show the strain induced by PLD-NRs and MOD-NPs in the matrix. The strain component maps show that tensile and compressive stain are localized around the coherent NR interfaces and extend for more than 10 nm that has been observed in other PLD-BZO-NRs films.39, 40 The >10 nm extended strain region should lead to NRs overlapping at low dopant vol.% with a corresponding disruption of current percolation and lower Tc and Jcs.f.. For the MOD-BHO-NPs, the strain is localized (~2 nm) around the incoherent NP/matrix interfaces and decays to strain fluctuation values typical of undoped MOD films. The small strained regions leave the matrix unaltered with no degradation of the superconducting properties. The sharp interfaces also have a favorable effect on the pinning force; for a similar pinning energy, a smaller region of variation produces a larger pinning force. To summarize, the key factors for enhancing current transport are a small NP size (~comparable to the vortex core size), high NP density and a sharp NP interface with the matrix.

Figure 3
figure 3

Structural and superconducting properties as a function of vol.% of additions and strain maps for pulsed laser deposition (PLD) and metal organic deposition (MOD) films. (a–c) Normalized c-axis length, Tc and Jcs.f. at 77 K as a function of vol.% of additions, respectively. (d,e) High-resolution plan-view images, where ɛxx, ɛyy and ɛxy maps were determined by geometrical phase analysis for BaHfO3 (BHO) nanorod (NR)-doped PLD-GdBCO and +12BHO (dcoat=30 nm) films, respectively. The horizontal bar scale indicates 5 nm for both (d, e).

Dramatically higher Jc with nearly isotropic angular dependence

We now focus on the in-field properties. In Figures 4a–c, we show the field dependence of Jc(H||c) at different temperatures for the standard +12BZO (dcoat=150 nm) and +12BHO (dcoat=30 nm) films. For the standard film, Jc is nearly constant at low fields up to a characteristic crossover field μ0H*, defined at a criterion of 0.9* Jcs.f., followed by a power-law regime (JcHα) at intermediate fields. Finally, a more rapid decay of Jc is observed as H approaches the irreversibility field. This behavior occurs at all temperatures with α~0.63–0.7.41

Figure 4
figure 4

Critical current density as a function of magnetic field amplitude and angle. (ac) Jc(H||c) for the (YGd)BCO, +12BZO (dcoat=150 nm) and +12BHO(dcoat=30 nm) films at 77, 65 and 26 K, respectively. Inset: Fp0H curves of the +12BHO (dcoat=30 nm) film at each temperature. For comparison, the data for the Ba2YNbO6 nanorod (NR)-doped pulsed laser deposition (PLD) films45 at 65 and 75 K are included. (d–f) Jc as a function of angle for the (YGd)BCO, +12BZO (dcoat=150 nm) and +12BHO (dcoat=30 nm) films at 77, 65 and 26 K, respectively. For comparison, the data for Ba2YNbO6 NR-doped PLD films,45 BaZrO3 (BZO) NR-doped PLD films,47 BZO nanoparticle (NP)-doped metal organic deposition (MOD) films21 and BZO NR-doped MOCVD films17 are included.

For both NP films, we observe an increase in Jcs.f. and μ0H* at all temperatures, consistent with a much larger density of NPs.42 This improvement is maintained as a function of field with Jc(H) that does not follow the standard power-law dependence. This type of non-power-law dependence is similar to that observed in cuprate21, 31, 41, 43 and pnictide films44 with the strong pinning in both cases being due to the NPs. Because of the large NP size (~25 nm) in the +12BZO (dcoat=150 nm) film, NPs cease being the dominant pinning center at low temperatures; the significant improvements at high temperatures are lost, and a power-law dependence is regained similarly to the reference film.41 However, given the small size (~7 nm) of the +12BHO (dcoat=30 nm) films, a non-power-law Jc(H) decay is observed, indicating that NPs are the dominant pinning center at all temperatures. This is also seen in the magnitude of the Jc increase at 3 T that is approximately a factor of 6 at all temperatures (see Table 1).

Table 1 Critical current density ratio at 3 T

The remarkable in-field performance of the +12BHO (dcoat=30 nm) film is highlighted in the insets of Figures 4a–c, where the pinning force, Fp=Jc(H) × μ0H, is compared with the highest previously reported values.34, 45 At high temperatures, the +12BHO (dcoat=30 nm) film shows a maximum Fp=33 GN m−3 at 77 K and 124 GN m−3 at 65 K. Moreover, at T=26 K, the Fp of the +12BHO (dcoat=30 nm) film reaches a nearly constant ~677 GN m−3 from μ0H>3 T up to 9 T, an Fp value 10 times greater than that of Nb3Sn at 4.2 K.46 Because the pinning landscape is produced by NPs, Fp measured along the c-axis is actually close to the minimum value as a function of angle, not the maximum, contrary to the case of films with NRs,45 as can be observed in the Jc(θ) curves of Figures 4d–f. For the +12BZO (dcoat=150 nm) film, the BZO NPs are much less effective at 26 K than at a higher T. However, for the +12BHO (dcoat=30 nm) film, we see significant Jc increases for all orientations and temperatures compared with that of the BZO MOD films, with a higher Jc minimum (Jc,min) than that previously reported for any REBCO film or wire.17, 21, 45, 47, 48

Relation between flux creep and NP density

The different temperature dependence of the Jc improvement (seen in the Jc ratio) between BZO and BHO has its origin in the NP size (DNP) relative to the normal-core diameter (2ξab), as shown in Figure 5a. For BZO (DNP~25 nm), DNP/2ξab is 1.5 at 80 K but >4 at low temperatures, whereas for BHO (DNP ~7 nm), d/2ξab1 and ~2 at high and low temperatures, respectively. Values of d/2ξab >3 or <<1 lead to less effective pinning;44 thus, the ability of the 7-nm BHO NPs to increase Jc is higher and is restrained to lower temperatures.

Figure 5
figure 5

Field dependence of the flux creep rate and the Jc ratio. (a) Temperature dependence of the size ratio (DNPs/2ξab) for the +12BZO (dcoat=150 nm) and +12BHO (dcoat=30 nm) films. (b) Field versus Jc ratio (ΔJc=Jc,BMO/Jc,standard) at H||c and 65 K for +12BZO (dcoat=150 nm) and +12BHO (dcoat=30 nm) films. Inset: HJc,max) at H||c for BaZrO3 (BZO) nanoparticle (NP)-doped iron-based films44 (open squares); and for +12BHO (dcoat=30 nm) films (solid stars). HJc,max) at H||c. (c) Temperature dependence of S for the (YGd)BCO, +12BZO (dcoat=150 nm) and +12BHO (dcoat=30 nm) films at H||c and 3 T. (d) Field dependence of the flux creep rate S for the (YGd)BCO, +12BZO (dcoat=150 nm) and +12BHO (dcoat=30 nm) films at H||c and 65 K.

Insights into the benefit of further increasing NP density are found by plotting the ratio Jc,BMO/Jc,standard vs μ0H in Figure 5b; this ratio has a strong correlation with the density of NPs.44 The +12BHO (dcoat=30 nm) film shows a maximum Jc ratio (ΔJc,max) of 6.5 near μ0HJc,max) ~3.5 T. The field values are extremely close to μ0HNP, the field at which the intervortex distance (af) matches LNP (~20 nm). The new data fit extremely well with the μ0HJc,max)~n~1/2 universal dependence44 we found for the cuprates and pnictides with NPs, indicating that the maximum effects are obtained when af~LNP.

This condition (af~LNP) is also manifested in the flux creep rate. The flux creep rate measures the rate at which vortices exit pinning centers as a result of fluctuations. These fluctuations enable vortex depinning via different types of excitations, thus effectively reducing Jc.49 In Figure 5d, we find that S is significantly reduced with respect to that of (Y,Gd)BCO when NPs are included. The stronger the pinning, the smaller S is; however, more importantly, the reduction of S(H) continues up to higher field strengths with an increasing density of BMO NPs; the maximum field for the low creep onset (μ0H(Sonset)) is 1.5 T for the +12BZO (dcoat=150 nm) film and 3.5 T for the +12BHO (dcoat=30 nm) film (see arrows in Figure 5b). Thus, it is clear that the maximum improvement, as evidenced by μ0HJc,max) and μ0H(Sonset)), can be achieved with the same characteristic field when af~LNP, where af is the intervortex distance.

Not only is the onset pushed to greater fields, but the field slope of S is greatly reduced, such that S for BHO at large applied fields is much smaller. This reduction in S is maintained at all temperatures, as shown in Figure 5c. There is additional evidence of the link between S improvement and Jc enhancement; a lower S(T) for BZO is observed down to ~40 K, where DBZO/2ξab(T)~3, which is concomitant with the loss of the non-power-law behavior in Jc(H) and the marked decrease in the Jc,BZO/Jc,standard ratio.41 On the other hand, the +12BHO (dcoat=30 nm) film shows a lower S at all temperatures compared with that of the other two films. These data indicate the importance of both density and size to reduce flux creep as well as to increase Jc. Ultimately, the maximum improvement produced by the NP additions in Jc(H) occurs when the elastic energy is minimized and thermal activation effects are reduced by the strong pinning of the high-density BHO NPs.

All of these improvements are obtained with simple multicoating deposition without the need for ex situ treatments or convoluted procedures. The easily controlled and fabricated nanostructured functional material with greatly enhanced and nearly isotropic Jc(θ) shows that materials can be grown to target different applications.

Simple pinning model for superconductor with strong pinning NPs

We have seen the clear effect of high-density BHO NPs on the enhancement of Jc and the reduction of thermal activation. The challenge now is to quantify improvements to be able to target specific applications based on Jc(T, H, θ). Several models have been proposed to explain Jc(T, H, θ) in cuprate and pnictide superconductors with strong pinning NPs or NRs.21, 24, 50, 51, 52, 53, 54, 55, 56, 57, 58, 59 Although the influence of creep on Jc for these superconductors has been known for a long time,49, 60 only a few attempts have been made to link the pinning improvements to Jc and S.60, 61

To calculate the temperature, magnetic field and field angle dependence of Jc (), we use , where t0 is the effective attempt time, Jc0 is the creep-free Jc and S is the experimentally obtained flux creep rate.

Here, we assume that NPs are elliptical; thus, the creep-free Jc for NPs is given by

where l0 is the NP diameter at θ=0°, that is, along the c orientation, c/b is the ratio of the NP dimensions along the c and ab orientations, respectively, and γ is the electronic mass anisotropy.50 Here, the temperature dependencies are simply assumed as and , and the field-dependent factor comes from the reduction in the condensation energy.62 A detailed derivation of these equations is shown in Supplementary Figure S1. We focus on the additional pinning from NPs, assuming that the rest of the pinning landscape remains unchanged. To take into account the effect of fluctuations, Jc0 (creep-free Jc) must be calculated that is then added to the NP contribution using statistical summation.63, 64 Using , where is the experimental Jc for standard (Y,Gd)BCO, the calculated Jc for a composite sample is

The parameters used are listed in Supplementary Table S1.

Figure 6a shows the temperature dependence of the experimental Jc (symbols) and calculated Jc (solid lines) for the +12BZO (dcoat=150 nm) and +12BHO (dcoat=30 nm) films at H||c=3 T. Using as average NP size DBMO from microstructural data and the experimental S(T), in Figure 6a, we show that the calculated Jc values for both films are in good agreement with the experimental Jc. The field dependence of the calculated Jc at H||c and 65 K for NP-doped films is again in very good agreement with the experimental Jc(T) data shown in Figure 6b. Figures 6c and d show the angular dependences of the measured Jc (symbols) and the calculated Jc (lines) for the +12BHO (dcoat=30 nm) film at (65 K, 3 T) and (26 K, 6 T) and the calculated Jc0 for the BHO NPs . The agreement is very satisfactory in both cases given that the large temperature difference (65 and 26 K) induces large changes in the superconducting values that are taken into account by the model using the same parameter values. Careful comparison of the experimental and calculated Jc(θ) show some disagreement at 30–80° with better fits for BZO (Supplementary Figure S2) than BHO (Figure 6). The deviation is associated with the NP contribution and could be associated with only using the average value of the NP size rather than the actual size distribution and because of the fact that the pinning landscape changes slightly after adding NPs.26 The most important feature of the present model is that all the parameters used are derived by fitting to a limited set of experimental data (no free parameters) and that temperature, angle and field properties at other experimental conditions are then calculated.

Figure 6
figure 6

Experimental and theoretical Jc as a function of field, temperature and angle. (a) Temperature dependence of the experimental Jc (symbols) and theoretical Jc (solid lines) for +12BZO (dcoat=150 nm) and +12BHO (dcoat=30 nm) films at H||c and 65 K. (b) The field dependence of experimental Jc (symbols) and theoretical Jc (solid lines) for +12BZO (dcoat=150 nm) and +12BHO (dcoat=30 nm) films at H||c and 65 K. (c, d) Angle dependence of experimental Jc (symbols) and theoretical Jc (solid lines for (YGd)BCO, +12BZO (dcoat=150 nm) and +12BHO (dcoat=30 nm) films at H||c and 65 K. In (c, d), the dashed line is the Jc0 for the +12BHO (dcoat=30 nm) films at each measurement condition. For comparison, the experimental Jc of (YGd)BCO films is also shown in (a–d).

Conclusion

To summarize, we have demonstrated the ability of adding a large density of second-phase NPs of tunable size without affecting the host matrix. We show that limiting diffusion (thermally and/or spatially) is the key to reducing the NP size; we achieve this by selecting a second-phase material with lower crystallization temperature and modulating the precursor composition through the deposition layer thickness. This ability, coupled with extremely good modeling, indicates that MOD REBCO can be used for specific performance requirements and that this NP tuning method is amenable to other functional perovskite materials.