1. Introduction
Iron-based superconductors (FBSs) have attracted significant attention owing to their relatively high superconducting transition temperature (
Tc) of 58 K [
1,
2,
3]. In 2008, FBSs were discovered through F-doped LaOFeAs [
3], and since then, more than 100 compounds have been reported belonging to this high-
Tc superconductor. On the basis of parent compound structures, these compounds can be categorized into 6–7 families [
2,
4,
5,
6]:
REOFeAs (1111) (
RE = rare earth),
AFe
2As
2 (
A = Ba, K, Ca) (122), FeSe
xTe
1-x (11), CaKFe
4As
4 (1144), and LiFeAs (111), the 11 family. FeSe belongs to the 11 family [
7,
8] and has the simplest crystal structure [
9,
10] in FBSs. Generally, it shows a superconducting transition at 8 K which can be significantly enhanced up to 37.6 K under an applied external pressure of ~4.15 GPa [
11]. Many new superconductors have been derived from FeSe with enhanced superconductivity, including
AxFe
2-ySe
2 (
A = K, Rb, Tl, etc.) [
12,
13] and other organic intercalated superconductors, (Li, Fe)OHFeSe [
14], heavily electron-doped FeSe through gating or potassium deposition, and in particular, single-layer FeSe/SrTiO
3 films with a record high
Tc of ~100 K [
15,
16].
Various kinds of doping have been reported, such as Cu [
17,
18], Ni [
19], Cr [
20], Co [
8] at Fe sites, and S [
8,
21,
22] and Te [
8] at Se sites, to understand the superconducting mechanism and to enhance superconducting properties [
23]. It has been reported that when Te is substituted at Se sites, the highest
Tc of up to 14.8 K is achieved with an optimal Te content of 50% [
24]. Additionally, the 11 family does not contain any dangerous or rare earth elements and shows a high critical density (
Jc ≈ 8.6 × 10
4 A/cm
2 at 0 T, 2 K) and high upper critical field (
Hc2 ≈ 50 T) [
25,
26] for single crystals, which is interesting for a range of applications, such as superconducting magnets, wires, and tapes [
27]. On the other hand, preparing single-phase superconducting bulks is difficult for this 11 family because the complicated phase diagram of FeSe has many stable crystalline forms such as tetragonal
β-Fe
xSe, hexagonal
δ-Fe
xSe, orthorhombic FeSe
2, tetragonal
β-Fe
xSe, monoclinic Fe
3Se
4, and hexagonal Fe
7Se
8, in which the tetragonal phase generally exhibits superconductivity with
Tc∼8 K [
7]. Some of these stable phases, particularly hexagonal
δ-Fe
xSe and hexagonal Fe
7Se
8, appear with the main tetragonal
β-Fe
xSe phase during the growth process and are not suitable for superconducting properties [
28,
29].
Several types of processes have been reported to enhance flux-pinning behaviours such as metal additions, chemical doping using different metallic and non-metallic phases, high-energy irradiation, and the admixing of nanoparticles [
30]. Recent studies have shown that different metal additions may be an effective and feasible approach for enhancing the superconducting properties of FBSs by introducing additional pinning centres and comprehending the superconducting mechanism [
2,
6,
30,
31,
32,
33]. In high-
Tc cuprate superconductors, the critical current density
Jc of YBa
2Cu
3O
y (YBCO) is enhanced by Ag addition [
34]. Ag or Pb addition to the 122 family (Sr
0.6K
0.4Fe
2As
2) also enhances
Jc values with the improvement in grain connections. In a similar way, various kinds of metal additions, such as Ag [
35], Co [
36], Ni [
36], Li [
37], Pb [
38], and Sn [
39], are also reported for FeSe
0.5Te
0.5 bulks to enhance superconducting properties. The reported studies suggest that the addition of Li, Pb, or Sn has a positive effect to improve either transition temperature
Tc or critical current density
Jc [
37,
38,
39]. Therefore, further research works are needed to fully understand the impact of adding suitable metal elements and their appropriate weights to bulk superconductors to enhance all of their superconducting properties, i.e.,
Tc as well as
Jc of FBSs at the same time with high-quality samples.
Chen et al. [
39] studied 5 wt% (
x = 0,
y = 0.05) and 10 wt% (
x = 0,
y = 0.10) Sn-added FeSe
0.5Te
0.5 samples, where the 5 wt% Sn-added samples improved the superconducting offset transition temperature (
Tcoffset) significantly by ~3 K compared to that of Sn-free samples but had almost the same onset transition temperature (
Tconset) value as that of the parent compound. However, there is no report for a small amount of Sn addition, such as less than 5 wt% (
y < 0.05). Recently, Pb-added FeSe
0.5Te
0.5 has also been studied, and these results indicate that the superconducting transition is decreased and the impurity phase is enhanced with Pb addition due to the reduced Fe/Se/Te ratio from the stoichiometric FeSe
0.5Te
0.5 composition. However, 5 wt% Pb (
x = 0.05,
y = 0) addition has an onset
Tc of 13.8 K and improves the
Jc value in the measured magnetic field (up to 9 T) due to the improved grain connections. Hence, Pb addition weakens the superconducting transition of FeSe
0.5Te
0.5 while enhancing the intergranular behaviour and the critical current properties for a sample with a small amount of Pb (
x = 0.05,
y = 0). These reported studies suggest that it would be worthwhile to conduct additional research on the optimisation of very low amounts of Pb and Sn addition, such as
x =
y < 0.05, and process parameters in order to improve superconductivity and critical current properties. However, there are no studies available based on cometal addition to FeSe
0.5Te
0.5 polycrystalline samples or other families of iron-based superconductors. Because Pb effectively increases the critical current density [
38] and Sn improves the quality of the superconducting transition as reported [
39], it would be interesting to investigate the superconducting properties of FeSe
0.5Te
0.5 with a small amount of both Pb and Sn addition, especially with a very low amount of additions. These are our main motivations behind this research paper.
In this study, we synthesised a series of low amounts of Pb- and Sn-added FeSe0.5Te0.5 + xPb + ySn (x = y = 0, 0.01, 0.02, 0.03, 0.04, 0.05, and 0.10) and investigated the effects of Sn and Pb additions on the structure, microstructure, and superconducting properties of FeSe0.5Te0.5 bulks. Structural and microstructural analysis shows that the impurity phases are increased with higher Pb and Sn additions x = y ≥ 0.03; however, a low amount of addition such as x = y ≤ 0.02 enhanced the superconducting transition by around 1 K and also improved the critical current density. Our present study shows that a small amount of cometal addition is an effective way to improve grain connectivity, superconducting transition Tc, and pinning behaviours, resulting in an enhancement of the critical current density.
3. Results and Discussion
Powder X-ray diffraction patterns of FeSe
0.5Te
0.5 with various amounts of Pb and Sn additions (FeSe
0.5Te
0.5 +
xPb +
ySn) are depicted in
Figure 1a. All samples showed the main tetragonal phase with space group
P4/nmm. The parent compound (
x =
y = 0) also showed a small amount (~3–4%) of the hexagonal phase, which is similar to that of previously reported papers [
38,
39,
41]. The diffracted peaks are not deviated by the additions of Pb and Sn, according to a comparison of the XRD patterns of the parent compound with Pb- and Sn-added samples, as shown in
Figure 1a. It suggests that Pb and Sn do not enter into the tetragonal structure of FeSe
0.5Te
0.5. We also depicted the refined XRD patterns for low amounts of Pb- and Sn-added samples such as for
x =
y = 0.01, 0.02, and 0.03 in
Figure 1b–d, respectively. The obtained lattice parameters and the qualitative values of the impurity phases for various samples are listed in
Table 1. The superconducting phase’s crystallite size, as estimated by the XRD fitting data, was also mentioned in
Table 1. The crystal size was greater for the sample with
x =
y = 0.01 and 0.02 than that of other samples, but as further Pb and Sn were added, the crystal size shrank.
The parent compound has the lattice parameters (
a = 3.79502 Å,
c = 5.9713 Å) which are almost the same as the reported ones for bulk (
a = 3.7909 Å,
c = 5.9571 Å) and single crystals (
a = 3.815 Å,
c = 6.069 Å) of FeSe
0.5Te
0.5 [
8,
41]. Interestingly, the hexagonal phase is notably reduced by a small amount of Pb and Sn addition (
x =
y = 0.01) and completely eliminated for
x =
y = 0.03 as depicted in
Figure 1a–d, and this phase is not seen even at higher Pb and Sn additions similar to those reported for Pb [
38] or Sn additions [
39]. However, for Pb- and Sn-added samples, the Pb
0.85Sn
0.15Te
0.85Se
0.15 phase appeared as an impurity phase which is very tiny for
x =
y = 0.01 and 0.02 but increases in intensity with further increase in Pb and Sn additions. Impurity phase enhancement is very similar to that of Sn- or Pb-added FeSe
0.5Te
0.5 [
38,
39]. In the case of Sn-added FeSe
0.5Te
0.5 [
39], SnSe
0.3Te
0.7, and Fe
3O
4 exist in the Sn-added samples, and their intensities increase as the amount of Sn addition increases. In higher Pb addition to bulk FeSe
0.5Te
0.5 [
38], three extra phases such as PbTe, FeSe
1-δ, and Fe appeared as the impurity phases in which PbTe was observed as a dominant impurity phase, suggesting a lower Te content in the FeSe
0.5Te
0.5 composition. The existence of the Pb
0.85Sn
0.15Te
0.85Se
0.15 phase in this present study suggests a reduced concentration of Se/Te in the FeSe
0.5Te
0.5 composition. At high amounts of Pb and Sn additions, we also observed a small amount of Fe as an impurity phase, as mentioned in
Table 1. The obtained lattice parameters for various samples, seen in
Table 1, indicate divergence with cometal additions with respect to the parent compound (
x =
y = 0), which suggests slightly lower Te/Fe/Se contents. Due to the presence of the various impurity phases, the refinement error is slightly higher for large amounts of Sn and Pb additions. It is important to note that excessive Sn and Pb additions can decrease the Fe/Te/Se concentrations in FeSe
0.5Te
0.5 compositions, whereas moderate levels of these additions can promote the formation of a tetragonal superconducting phase, similar to what has been observed in Pb or Sn-added FeSe
0.5Te
0.5 [
38,
39].
These polycrystalline samples with
x =
y = 0, 0.01, 0.02, 0.03, 0.04, 0.05, and 0.1 were also subjected to an elemental analysis using the energy dispersive X-ray (EDAX) method, which allows for the measurement of the actual composition of the elements, as listed in
Table 2. The homogenous distribution of the constituent elements is observed for
x =
y = 0 and 0.01, 0.02, and 0.03, as confirmed by results in
Table 2. However, because of the impurity phase, the distribution of Sn and Pb in the samples with
x =
y ≥ 0.04 is not uniform, and some regions were found to be rich in Pb, Sn, Se, and Te, which proposes the existence of an impurity phase of Pb
0.85Sn
0.15Te
0.85Se
0.15, consistent with XRD results. The parent compound shows a molar ratio of 1:0.49:0.51 which is almost the same as the low amount of cometal additions. However, with a high amount of Pb and Sn additions, deviation with this molar ratio and the actual weight percent of cometal increases. These findings suggest that excessive additions of Sn and Pb result in non-uniform element distributions.
To perform the microstructural analysis, we polished the pellet samples by using micron paper inside the glove box and collected backscattered scanning electron microscopy (BSE-SEM, revealing chemical contrast) images at different magnifications for different Sn- and Pb-added samples.
Figure 2 shows BSE images for
x =
y = 0, 0.02, 0.03, and 0.1 from low- to high-magnification images, respectively. We have observed three contrasts in our samples: light grey, white, and black contrasts corresponding to the phases of FeSe
0.5Te
0.5, Pb
0.85Sn
0.15Te
0.85Se
0.15, and pores, respectively. The parent compound has light grey and black contrasts that are observed as almost homogeneous in microstructure images on the microscale, as depicted in
Figure 2a–c. Furthermore, these images also confirm that the samples with
x =
y = 0 have many well-connected and disk-shaped grains with an average size of ~1–3 μm, and in some places, micropores are also observed. A minor amount of Sn and Pb addition (
x =
y = 0.01, 0.02) slightly increased the grain size (~3–4 μm) while decreasing pore sizes (from micro- to nano-range). Hence, many nanopores are observed, which results from the improved grain connectivity and sample density due to the reduced pore size compared to the parent compound, as shown in
Figure 2d–f. Furthermore, regarding the phase of Pb
0.85Sn
0.15Te
0.85Se
0.15, we saw a few brighter contrasts in the sample (
Figure 2d–f), similar to XRD analysis.
With further increasing the Pb and Sn additions, the improvement in the microstructure was observed with the enhancement of the brighter phase with respect to Pb
0.85Sn
0.15Te
0.85Se
0.15, as shown in
Figure 2d–f. It seems that the Pb
0.85Sn
0.15Te
0.85Se
0.15 phase filled up many nanopores, so we observed comparatively fewer nanopores for
x =
y = 0.02 compared to the bulk samples with
x =
y = 0.01 but almost the same grain size of ~3–4 μm. Hence, it suggests further improvement in grain connectivity and the density of materials.
Figure 2g–i show BSE images for
x =
y = 0.03 where the most prominent phase of Pb
0.85Sn
0.15Te
0.85Se
0.15 is observed as a white contrast randomly in the bulk sample at many places, i.e., inside grains and at grain boundaries, and also the size of pores as a black contrast is increased compared to samples with low Pb and Sn additions (
x =
y ≤ 0.02). The existence of pores and impurity phases in the sample results in weak grain connections, and the plate-shaped grains are observed with an average grain size of ∼1–2 μm, as observed from
Figure 2g–i. For further cometal additions (
x =
y > 0.03), a white contrast (Pb
0.85Sn
0.15Te
0.85Se
0.15) is observed in larger areas and at many regions of the sample, and the reduced grain size is also observed as depicted in
Figure 2j–l for
x =
y = 0.1. The increased impurity phase (Pb
0.85Sn
0.15Te
0.85Se
0.15) that is sandwiched between FeSe
0.5Te
0.5 grains often considerably reduces grain-to-grain connections and creates a strong barrier to intergranular supercurrent routes. It is well known from other iron-based superconductors that substantial cracking occasionally occurs at grain boundaries and within grains, but we did not see any micro-cracks between the grains in any of our bulk samples [
42,
43]. Since FeSe
0.5Te
0.5 has a theoretical density of 6.99 g/cm
3 [
7,
44], on this basis, we calculated the sample density by assuming the pure phase of FeSe
0.5Te
0.5 for our various samples, which are obtained around 51%, 61.9%, 65.6%, and 50.8%, for
x =
y = 0, 0.01, 0.02, and 0.03, respectively. It indicates that a very small amount of Sn and Pb content added to the parent sample slightly enhanced the sample density as also observed from the microstructure analysis. Analysis of
Figure 2 clearly demonstrates that a very small amount of Pb and Sn addition (
x =
y ≤ 0.02) improves grain connectivity and sample density and decreases pores in contrast to a larger amount of Pb and Sn additions (
x =
y >0.02), which reduce the phase purity and cleanness of grain boundaries and increases the number of pores. Non-superconducting phases at the grain boundaries of FeSe
0.5Te
0.5 for higher cometal additions generally create a problem for superconducting properties, as also reported for Pb-added Sr122 [
45], Pb-added FeSe
0.5Te
0.5 [
38], and Sn-added FeSe
0.5Te
0.5 [
39]. As a result, our analysis suggests that a very small amount of Pb and Sn additions work effectively to increase material density while also improving grain size and connectivity.
Figure 3 depicts the DC magnetic susceptibility (
χ = 4π
M/
H) in both zero-field-cooled (ZFC) and field-cooled (FC) magnetisation curves for samples,
x =
y = 0 and
x = 0.05,
y = 0;
x =
y = 0.01,
x =
y = 0.02 and
x =
y = 0.03 measured under an applied magnetic field of 20 Oe in the temperature range of 5–20 K. We have shown the normalised magnetic susceptibility for all these samples for a comparison point of view. What one can safely conclude from
Figure 3 is that the studied samples are bulk superconductors. Superconducting transition is observed at 14 K with a sharp diamagnetic transition in the magnetic susceptibility (
χ) in both the ZFC and FC situations for the parent compound (
x =
y = 0). Only the Pb-added sample (
x = 0.05,
y = 0) shows the onset transition at 13.3 K and has a broader transition than that of the parent compound. Interestingly, a small amount of Pb and Sn such as
x =
y = 0.01 slightly enhanced the transition temperature (
Tc~14.8 K) with the sharpness of transition compared to the sample
x = 0.05,
y = 0. With the further addition of Pb and Sn, almost the same superconducting onset transition of 14.7 K is observed for
x =
y = 0.02 with better sharpness of the transition compared to other samples. However, a further increase in Pb and Sn additions reduces the transition temperature with the large broadening of the transition. It might be possible due to the formation of impurity phase Pb
0.85Sn
0.15Te
0.85Se
0.15 and to reduce the actual content of Te and Se from the main phase FeSe
0.5Te
0.5 as discussed above with the XRD data and the microstructural analysis
. The single-step transition of each sample can be explained by the intergranular properties of these bulk samples, as discussed and reported for other FBS families [
46]. These analyses also confirm that a very low amount of Sn- and Pb-added samples (
x =
y ≤ 0.02) are effective for the superconducting properties of FeSe
0.5Te
0.5 similar to the conclusion of microstructural analysis and XRD measurements. Further,
Tc is decreased as Sn and Pb concentrations are increased, possibly due to changes in Te/Se concentrations.
The temperature dependence of the resistivity (
ρ) is shown in
Figure 4a–c for the nominal compositions of polycrystalline FeSe
0.5Te
0.5 +
xPb +
ySn (
x =
y = 0–0.1) in a zero magnetic field. Due to the structural phase transition, the parent FeSe
0.5Te
0.5 (
x =
y = 0) exhibits a large anomaly in resistivity at a temperature of below ~110 K [
47]. As reported [
38] for Pb-added Fe(Se, Te), the electrical behaviour of this sample gradually changed, and a somewhat higher value of the normal state resistivity was observed due to the tiny amount and uneven distribution of the impurity PbTe phase with only Pb addition (
x = 0.05,
y = 0), and this resistivity anomaly also appeared for these Pb-added samples (
x = 0.05,
y = 0). A small amount of Sn and Pb addition to FeSe
0.5Te
0.5 up to
x =
y = 0.03 increases the metallic behaviour and its resistivity decreases in the whole temperature range. Interestingly, the anomaly related to the structural phase transition is also observed for these samples. A kink or concavity feature appeared for samples with very low amounts of Pb and Sn (
x =
y = 0.01, 0.02 and 0.03) below 80 K, which is similar to the behaviour reported for FeSe [
48] or Fe(Se, Te) samples [
49], and is usually linked with the weak structural distortion or attributed to the weak localisation effect [
48,
49].
With further enhancements of Pb and Sn additions (
x =
y ≥ 0.03), the resistivity started to increase in the normal state and showed semi-metallic behaviour below the structural phase transition. The amount of the Pb
0.85Sn
0.15Te
0.85Se
0.15 phase is enhanced very rapidly for samples with
x =
y > 0.03 as discussed above, and its distribution inside the sample became more homogeneous with a reduction in the whole sample density as observed from the microstructural analysis, which could be a reason for the enhancement of the normal state resistivity, as in
Figure 4a, which is visible more clearly below the structural transition. The sample with
x =
y = 0.1 has shown high resistivity values within the whole measured temperature range due to the very large amount of impurity phases. However, the low amount of addition of Pb and Sn (
x =
y ≤ 0.02) increased the density of the samples, as discussed in the microstructural analysis, which could be a reason for the decreased resistivity of these samples and supported the formation of the superconducting tetragonal phase. The observed properties of the sample with
x =
y = 0.03 depict the combined effect of low and high amounts of Pb and Sn additions, suggesting that this could be the optimum cometal addition level. Due to the presence of impurity phases, the higher Sn- and Pb-added samples (
x =
y > 0.02) had a negative slope of resistivity below 120 K, which primarily manifests as semi-metallic behaviour.
The low-temperature behaviour of the resistivity (
ρ), as a function of temperature from 5 K to 18 K, is shown in
Figure 4b, where each sample depicts a superconducting transition. The parent compound shows a transition temperature of around 14.8 K with a transition width (
ΔT) of 3.1 K. The samples with
x =
y = 0.01 and 0.02 have an enhanced transition temperature of 15.6 K and 15.4 K, respectively with a sharper superconducting transition. With further increases in Sn and Pb additions, the transition temperature is decreased with the broader transition width. Interestingly, the sample with
x =
y = 0.03 shows the onset transition of 12.8 K. With further increases in Sn and Pb additions, the onset
Tc reduces very slowly but exhibits a relatively broad transition with a low
Tcoffset. The onset
Tc is observed around 12.1 K, 11.9 K, and 11.6 K for the samples with
x =
y = 0.04,
x =
y = 0.05, and
x =
y = 0.1, respectively.
More interestingly, their
Tcoffset values differ significantly. According to reports, samples with 5% Pb addition show comparable
Tconset values (13.8 K), which is around 1.1 K lower than the value for the Pb-free sample [
38]. Chen et al. [
39] reported that 5% Sn-added FeSe
0.5Te
0.5 (
x = 0,
y = 0.05) has
Tconset = 13.8 K and
Tcoffset = 12 K with respect to
Tconset = 13.5 K and
Tcoffset = 9 K of the parent compound which dramatically enhanced the zero resistivity temperature (
Tcoffset) by 3 K accompanied by almost the same onset temperature of the superconducting transition (
Tconset) [
39]. Interestingly, a low amount of cometal Sn and Pb addition improved the onset transition temperature and also reduced the transition width, which works well accordingly to previous studies [
38,
39]. The sharper transition for the 1 and 2 wt% Sn- and Pb-added samples (
x =
y = 0.01, 0.02) suggests better grain connections and slightly higher Te/Se concentrations than the Sn- and Pb-free one (
x =
y = 0) which might be due to reducing the hexagonal phase, as discussed for XRD measurements. On the other hand, further increments of Sn and Pb addition exhibit the broadening of superconducting transition which might result due to the increased impurity phase (Pb
0.85Sn
0.15Te
0.85Se
0.15) and the decreased superconducting phase. The slight decrease in the lattice parameters with Sn and Pb addition, as mentioned in
Table 1, suggests that there is a lower Se/Te concentration in the FeSe
0.5Te
0.5 composition, which is also supported by EDAX measurements (
Table 2). This could be a possible reason for the reduced transition temperature
Tc at high Pb and Sn additions. The reported study based on Li-doped FeSe
0.5Te
0.5 [
37] has confirmed that the doping element Li entered the crystal structure of Fe(Se,Te) and enhanced the superconducting transition by 1–1.5 K for 1 wt% doping without affecting the
Tcoffset. In contrast to these earlier findings, adding 5% Sn to FeSe
0.5Te
0.5 can significantly raise
Tcoffset by 3 K without affecting
Tconset while not altering the crystal structure of the compound. The magnetic elements such as Co and Ni at Fe sites reduce the superconducting properties of FeSe
0.5Te
0.5 [
41]. Our current results show the enhancement of
Tconset by ~1 K and also slightly improved
Tcoffset by a very small amount of Sn- and Pb-added samples without entering the crystal structure of FeSe
0.5Te
0.5 which implies that a small amount of Sn and Pb (
x =
y ≤ 0.02) seems to be the most promising additive among metals to further improve the superconductivity in the 11-type FBSs.
The offset transition temperature (
Tcoffset) generally relates to the grain connections, i.e., the intergrain effect, whereas the onset transition temperature (
Tconset) represents the specific grain effect, i.e., the intragrain effect [
50,
51]. These effects can be understood by the resistivity measurements under different applied currents. To understand the grain connectivity behaviours of our bulk samples, we have depicted the low-temperature resistivity behaviours of various bulk samples with three different currents,
I = 5, 10, and 20 mA, in
Figure 4c. The bulk samples with
x =
y = 0.01 and 0.02 have almost no transition broadening with various currents and also a sharper transition compared to that of the parent compound (
x =
y = 0). The transition broadening is increased for higher Pb and Sn additions (
x =
y ≥ 0.02), and the offset transition is more sensitive with the applied currents, as shown in
Figure 4c which could be due to the enhanced impurity phases as observed from XRD patterns. It clearly suggests that a low amount of cometal (
x =
y = 0.01 and 0.02)-added samples have a better intergrain effect than that of the parent compound. These outcomes support the analysis of microstructural studies, as discussed above. A previous study shows that 5 wt% Pb-added FeSe
0.5Te
0.5 has almost the same broadening with applied current as that of the parent compound but has a shaper transition. However, higher Pb additions reduce the grain connections due to the enhancement of the impurity phase. Compared to our results with only Pb-added samples, a low amount of cometal additions to FeSe
0.5Te
0.5 has almost no broadening of the transition with respect to the applied current, which suggests better grain connectivity. These results well agree with microstructural and XRD analysis.
Magnetic moment hysteresis loops
M(
H) at a constant temperature of 7 K for
x =
y = 0,
x = 0.05,
y = 0;
x =
y = 0.01, 0.02, and 0.03 were measured with the rectangular-shaped sample in order to determine the persistent critical current density
Jc. The measured magnetic loops
M(
H) for these samples were observed under ferromagnetic effects, which is similar to previous reports based on FeSe samples [
29,
38,
52]. The inset of
Figure 5a shows the
M(
H) loop for Pb- and Sn-added samples with
x =
y = 0.02, which is depicted after the subtraction of the normal state magnetisation, i.e., the
M(
H) loop at 22 K. Similar magnetisation loops, with larger backgrounds, however, were obtained for a sample with high Pb and Sn additions.
These hysteresis loops allow us to estimate the critical current density, which is an important parameter for practical applications. The Bean critical state model [
53] was applied to obtain the critical state densities from the magnetisation loops. The calculation of the critical current density
Jc for our samples was performed using the formula
Jc = 20Δ
m/
Va(1−
a/3
b) [
53], where Δ
m is the hysteresis loop width,
V is the volume of the sample, and
a and
b are the lengths of the shorter and longer edge, respectively.
Figure 5a depicts the magnetic field dependence of the critical current density (
Jc) up to 9 T at 7 K for the parent compound with various Pb- and Sn-added samples.
Jc values of the parent compounds were enhanced by adding 5 wt% Pb to FeSe
0.5Te
0.5 (
x = 0.05,
y = 0), whereas, with the addition of Sn and Pb, i.e.,
x =
y = 0.02, the
Jc values are further enhanced in the whole magnetic field range up to 9 T. Interestingly, the calculated
Jc of samples
x =
y = 0.01 and 0.02 has field dependence almost similar to that of Pb-added samples (
x = 0.05,
y = 0) and enhanced one order of magnitude of the
Jc values compared to the parent compound. This improvement in
Jc values suggests that cometal inclusion is capable of providing effective flux-pinning centres. It could be possible due to the increased density and improved grain connections caused by the addition of a small amount of Sn and Pb, which are clearly observed in the microstructural analysis and resistivity studies. In pure bulk MgB
2 polycrystalline samples, the same observation was observed [
54], where Ag nanoparticle addition enhances the
Jc value due to extra pinning centres. One should note an important point that the 5% Pb-added sample (
x = 0.05,
y = 0) has almost the same
Jc values [
38] and similar behaviour as that of 1% Sn- and Pb-added samples (
x =
y = 0.01). It clearly suggests that Sn can be the most effective metal to enhance the
Jc value for FeSe
0.5Te
0.5 samples, which is comparable to the reported elevation of
Jc values for Sn-added SmFeAs(O,F) [
50] where Sn additions also work more effectively to improve the intergranular current than that of other metal additions [
30].
To understand the pinning behaviours of these samples, the magnetic field dependence of the vortex pinning force density,
Fp, has been calculated by
Fp = μ
0H ×
Jc [
55] with the obtained
Jc values at 7 K which are depicted in
Figure 5b for various samples. The
Fp curves of the parent compound increase with magnetic fields and reach a maximum around 8–9 T, whereas 1 wt% Pb and Sn additions show a maximum of
Fp for low magnetic fields, and then they decrease very slowly with the applied fields. Further Sn and Pb additions enhance
Fp values in the whole measured fields and shift the maximum of
Fp to the higher magnetic field as similar to 5 wt% Pb-added samples (
x = 0.05,
y = 0). The samples with
x =
y = 0.03 showed similar behaviours to 1 wt% Pb- and Sn-added FeSe
0.5Te
0.5 but with lower values of
Fp compared to all other samples depicted in
Figure 5b. This is unusual behaviour, most likely caused by cometal addition, that warrants further investigation to understand how cometal additions can influence the vortex pinning mechanisms in FeSe
0.5Te
0.5 compounds. The
Fp values are enhanced up to the intermediate field (~5–6 T) range for the small amount of Pb- and Sn-added FeSe
0.5Te
0.5 (
x =
y ≤ 0.02) compared to that of the parent compound (
x =
y = 0) which is in nice agreement with the
Jc enhancement as depicted in
Figure 5a. Briefly, 5 wt% Pb-added samples (
x = 0.05,
y = 0) also enhanced the
Fp values, which are similar to the previous report [
38] and higher than those of 1 wt% Pb- and Sn-added samples and their parent compounds. Furthermore, the obtained
Fp values of the parent compounds are almost the same as those reported (0.1–1 GN/m
3) in previous studies [
52,
56] based on polycrystalline Fe(Se, Te) samples. The
Fp behaviour leads us to the conclusion that improving the appropriate pinning centres is a reason for the enhancement of the critical current behaviours. There are also reports of similar results for Ag-added MgB
2 [
54] and Sn-added alternative FBS bulk samples [
50]. High-pressure techniques such as high-pressure growth and high-pressure sintering can be used to further improve the
Jc and
Fp of these samples [
2,
56].
To summarise the main findings of our study, the variation of transition temperature
Tconset, the transition width (
ΔT), the room temperature resistivity (
ρ300K), the
RRR (
ρ300K/
ρ20K), and the critical current density (
Jc) for 0 T and 5 T at 7 K with weight concentrations of Pb- and Sn-added samples (
x,
y) are shown in
Figure 6a–e. The
Tconset is enhanced by ~1 K for 1 and 2 wt% Pb- and Sn-added samples. With further increases in the weight of these concentrations, the
Tconset value starts to decrease (
Figure 6a). The value of transition width
ΔT (=
Tconset −
Tcoffset) also reduces with a small amount of Sn and Pb addition and reaches a minimum value for 2% weight Pb and Sn addition; i.e., it has a sharp transition with respect to other samples as depicted in
Figure 6b. This is a clear indication of higher homogeneity, better grain connectivity, and phase purity of this sample compared to other samples. On the other hand, the broadening of the transition, i.e., the transition width
ΔT starts to enhance with further increases in Pb and Sn additions and becomes almost saturated for
x =
y ≥ 0.04. The addition of Pb and Sn also enhanced the metallic nature of the FeSe
0.5Te
0.5 sample at room temperature; i.e., the resistivity
ρ300K decreased for a low amount of metal additions, as shown in
Figure 6c, and
ρ300K reached minimum values for 3 and 4%weight Sn- and Pb-added samples. With further enhancements of Pb and Sn,
ρ300K started to increase, which is due to the enhancement of the impurity phases as discussed above. We also calculated and plotted the residual resistivity ratio
RRR value for all samples, as depicted in
Figure 6d. The maximum
RRR is observed for the samples with
x =
y = 0.02, and after that,
RRR started to decrease with further increases in Pb and Sn additions.
The maximum of
RRR and the minimum of
ΔT are other transport signatures of the high quality of the polycrystalline samples with
x =
y = 0.02. The onset
Tc was reduced, and the transition width,
ΔT, and
ρ300K were enhanced with increasing Pb and Sn additions. It is worth noting that the
RRR for our best samples was 2.2, which is higher than the reported value (1.3) for the 5 and 10% Sn-added FeSe
0.5Te
0.5 samples [
39] and also better than the reported (1.8) for the Pb-added FeSe
0.5Te
0.5 samples [
38]. A very small amount of Sn and Pb additions improved the overall
RRR of the parent compound, as similar to those reported for Ag, Sn, and Pb additions [
32,
38,
39]. Meanwhile, 1 and 2 wt% Sn- and Pb-added samples show a ~1 K higher transition and a comparatively sharper transition width with
Tc of 15.6 K and a
Tcoffset of 13.2 K. The transition width of 2.4 K suggests a sharper transition than for the pure sample. In
Figure 5e, we plot the
Jc values at 0 T and 5 T for various Pb- and Sn-added samples with parent and only 5% Pb-added samples. It clearly indicates that a very small amount of the addition of Sn and Pb creates effective pinning centres and, in consequence, improves the critical current density by an order of magnitude with respect to the parent compound and also only Pb-added samples. This analysis suggests that a small amount of cometal addition improves both the superconducting properties and also the granular behaviour.
Disorder can significantly enhance superconductivity and has been utilised as an effective method to explore superconducting order [
57,
58,
59]. Strong disorder, on the other hand, increases phase fluctuations, which lowers the superfluid density and suppresses superconductivity globally [
59,
60]. As the disorder strength is varied, an optimal degree of inhomogeneity can be reached which enhances the superconducting properties and the transition temperature
Tc to reach the maximum value. Outside that region, strong disorder reduces superconductivity and can even cause a superconductor–insulator transition [
61], as observed in conventional superconductors, which are usually believed to be insensitive to small concentrations of random nonmagnetic impurities [
62]. On this basis, here, we can explain the enhancement of the superconducting properties of FeSe
0.5Te
0.5 with the correlation effect in the disorder which is generated by nonmagnetic cometal addition. A large amount of Pb and Sn addition generally creates strong disorder due to a large amount of impurity phase, as discussed above, and its behaviour shifts to the superconductor–insulation transition which is clearly observed through the resistivity measurements for high-Pb- and Sn-added FeSe
0.5Te
0.5 samples (
x =
y ≥ 0.04) (
Figure 4a). A very small amount of cometal addition such as (below
x =
y = 0.01) does not affect the superconducting properties, as observed from
Figure 6 with the dotted line, and more than 3 wt% cometal addition induces strong disorder which enhances rapidly with further Pb and Sn additions. On these analyses, we can conclude that 1 to 2 wt% cometal addition is the optimum region where the disorder strength improves the superconducting properties of the FeSe
0.5Te
0.5 bulk. Hence, it seems that the enhanced superconductivity of these materials is related to the effects of the disorder correlations as is well-reported for other superconductors [
59].