Abstract
The Mn + 1AXn phases (M = early transition metal; A = group A element and X = C and N) are materials exhibiting many important metallic and ceramic properties. In the present study powder processing experiments and density functional theory calculations are employed in parallel to examine formation of Zr2(Al1−xBix)C (0 ≤ x ≤ 1). Here we show that Zr2(Al1−xBix)C and particularly with x ≈ 0.58, can be formed from powders even though the end members Zr2BiC and Zr2AlC seemingly cannot. This represents a significant extension of the MAX phase family, as this is the first report of a bismuth-based MAX phase.
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Introduction
The MAX phases are a family of ternary carbides and nitrides. To be designated as a MAX phase, a compound should crystallize with the hexagonal P63/mmc structure in the general formula Mn + 1AXn with n being an integer, M being an early transition metal, A being a group 13–16 element and X being C and/or N1. More than half of known MAX phases were first synthesized in the 1960s by Nowotny et al.2 They were little studied for more than two decades until Barsoum and El-Raghy reported in 1996 the remarkable properties of Ti3SiC23 and further demonstrated these properties were shared by the other MAX phases4,5. Indeed, due to their structure consisting of the stacking of n “ceramic” layer(s) of MX interleaved by an A “metallic” plane, MAX phases are characterized by a combination of both ceramic and metallic behavior. Like most metals and alloys, they possess high thermal shock resistance, have a good machinability and high thermal and electrical conductivities while like most ceramics they have high decomposition or melting temperature and high elastic stiffness1. Furthermore, MAX phases are also of interest as precursors for MXenes (Mn + 1Xn two-dimensional nanosheets with properties analogues to graphene) currently only synthesizable by selective chemical etching of mostly Al-based MAX phases6,7.
From 1996 to 2004, intensive research expanded the MAX phase family to more than 60 compositions that included 9 different “M” elements, 12 different “A” elements and n values of 1, 2 and 31,8,9, Since then, new discoveries reported have mainly focused on MAX phases with higher n values and on solid solutions9,10,11, i.e. partial substitution of the M, A or X elements, hence broadening to a quasi-infinite number of possible combinations. In 2014, Naguib et al.10 listed 68 quaternary MAX phases compositions already reported. Quaternary MAX phases also offer the possibility of including new elements that do not form alone a bulk ternary MAX phase, such as Mn recently incorporated in (Cr1−xMnx)2GaC (0 ≤ x ≤ 0.3) by Mockute et al.12
The crystal structure of the M2AX phases (or 211 MAX phases) is given in Fig. 1. For the M2AX phase the structure can be described as a highly symmetric hexagonal unit cell that contains atomic layers of the constituent elements stacked along the c direction. Two M layers enclose an X layer of atoms forming an M2X slab with a local fcc-type stacking sequence. Atomic layers of A separate the M2X slabs. Local stacking around the A layer has an hcp pattern and thus the A layer forms a mirror plane in the crystal. The crystal structure can be defined by the a and c lattice vectors and the interplanar separation between the M and X atomic layers (dMX).
A potentially significant application of MAX phases is their use by the nuclear industry. Ion and neutron irradiations studies performed since 200913,14, determined the good resistance (low swelling, limited decomposition or amorphisation) of MAX phase carbides and notably of Ti3SiC2. These properties make MAX phases candidate materials e.g. in the capacity of protective coatings for zirconium alloy nuclear fuel cladding. As tragically reminded by the recent events of Fukushima, in the case of a Loss-of-Cooling Accident (LOCA) and the impossibility to temper the reactor temperature, Zr clads can react over about 1200 °C with residual steam to catalytically produce H2, eventually leading to release of nuclear fuel in the reactor and to dramatic explosions. A way to avoid or at least postpone this catalytic reaction is via the protection of the nuclear fuel clad against high-temperature oxidation. Among the MAX phases, Zr2AlC would be advantageous as 1) Zr has a very high neutron transparency and is the main constituent of the substrate clad, 2) Al by its presence on the A metallic planes is likely to readily diffuse out to form an alumina protective layer appropriate for high temperature oxidation protection analogously to what is achieved for Ti2AlC1 and 3) C, as opposed to 14N does not lead to problematic activation products. Nevertheless, to our knowledge, there are no reports on the synthesis and thereby on the actual existence of Zr2AlC. It can be argued that other non-MAX phase ternary layered carbides such as Zr2Al3C4 could be suitable15, however the reported oxidation resistance of these carbides is insufficient16.
One possible way then to obtain a material having similar properties as those anticipated for Zr2AlC is to partially substitute one of the constituting elements by another one stabilizing the structure. As the number of possibilities to test is experimentally constraining, an informed pre-selection of compositions to investigate is necessary. In this sense and in respect to our targeted nuclear application, elements with high neutron cross-section (i.e. Hf, Ta, Cd and In notably) have to be avoided. Then, density functional theory (DFT) calculations can provide important insights into the material properties and phase stability of the candidate Mn + 1AXn phases that can be complementary to experimental studies17,18,19,20,21. Notably, for some of the Mn + 1AXn phases there is little empirical information as experiments are hindered by the difficulty of producing single phase samples22,23. Considering phase stability, previous DFT studies24,25,26 have correctly predicted the stability (or not) of Mn + 1AXn phases with respect to their competing phases.
In the present study DFT is employed to investigate the phase stability and structure of Zr2(Al1−xBix)C (0 ≤ x ≤ 1) while attempts were performed in parallel to form Zr2(Al1−xBix)C by powder processing.
Results and Discussion
Syntheses and characterizations
Heat treatments at 1300 °C and 1450 °C were initially chosen considering the conditions reported for the synthesis of other Zr2AC MAX phase4,27,28,29,30 to try producing Zr2BiC, Zr2(Al0.50Bi0.50)C and Zr2AlC. On the basis of initial results, a 1150 °C treatment was also tried. Phase determinations from X-ray diffraction (XRD) of all attempted syntheses are summarized in Table 1. Neither Zr2AlC nor Zr2BiC were obtained, whatever the temperature of reaction. This is consistent with the absence of reports of Zr2AlC and Zr2BiC syntheses, although 5 other Zr2AC MAX phases can be formed in similar experimental conditions (A = S, Sn, In, Tl or Pb)4,27,28,29,30,31. This also confirms that Zr2AlC and Zr2BiC are not (meta-)stable and/or are less stable than the combination of ZrC + ZrAl2 or ZrAl3 and ZrC + Bi + one unknown phase respectively obtained instead (Table 1).
More importantly, XRD determined that the attempt to synthesize Zr2(Al0.50Bi0.50)C at 1300 °C was partially successful as a MAX phase was formed along with ZrC and ZrAl2 (Fig. 2). During Energy Dispersive X-ray spectrometry (EDX) characterization, point analysis of over 10 independent MAX phase grains gave elemental ratio of (Al + Bi)/(Zr + Al + Bi) of 0.33(3), hence agreeing perfectly with a 211 MAX phase and a Bi/(Al + Bi) ratio of 0.58, with a dispersion of only±0.02, indicating the formation of Zr2(Al0.42Bi0.58)C. Note that the deviation from the targeted stoichiometry 1:1 Al:Bi is in agreement with the presence of ZrAl2 as a secondary phase, accommodating excess Al. Furthermore, Spark Plasma Sintering (SPS) was realized on the 1300 °C Zr2(Al0.50Bi0.50)C sample at the same temperature at 35 MPa for 10 minutes. Unexpectedly, the MAX phase content in the resulting densified ceramic sample dropped almost to zero with ZrC and ZrAl2 XRD patterns rising concomitantly. As it has never been reported that such pressure can decompose a MAX phase, it is more likely the decomposition temperature of the Zr2(Al0.42Bi0.58)C MAX phase lies somewhere around 1300 °C and is more advanced in SPS due to a temperature overshoot at the end of the heating ramp and/or because the vacuum helps Bi evaporating out of the system during the decomposition process. This concurs with Barsoum et al.4 and El-Raghy et al.28 works who found, respectively for Zr2SnC and Zr2PbC, that the decomposition temperature of such MAX phase is around 1300 °C.
From these initial findings, a lower temperature of synthesis was chosen, 1150 °C and was employed to attempt to synthesize the same Zr2(Al1−xBix)C compounds with x = 0, 0.50 and 1. As it was anticipated the Zr2(Al0.42Bi0.58)C compound obtained at 1300 °C could be the result of a particular structural stabilization process, a powder mix targeting Zr2(Al0.41Bi0.59)C was also prepared and fired at 1150 °C (x value of 0.59 was selected instead of 0.58 to comply with the ratio 19/32 ≈ 0.59 which was the closest ratio achievable in the DFT calculations). Here again Zr2BiC and Zr2AlC syntheses were unsuccessful, whilst for mixed compositions a single MAX phase was produced as the main phase as reported in Fig. 2. Figure 2 reveals that the relative ZrC content decreases with decreasing synthesis temperature as well as when targeting Zr2(Al0.41Bi0.59)C instead of Zr2(Al0.50Bi0.50)C. It is interesting to note that for all three syntheses that lead to the formation of a MAX phase, EDX characterization always gave an average Bi/(Al + Bi) ratio of 0.58 (±0.02 to 0.04 scatter). This is indirectly confirmed by comparing the unit cell parameters determined by XRD data refinement as the x = 0.50 and x = 0.59 syntheses at 1150 °C have very close unit cell parameters and corresponding volumes (a = 3.335(5) Å, c = 14.51(2) Å, V = 139.8(4) Å3 and a = 3.344(5) Å, c = 14.51(2) Å, V = 140.6(5) Å3, respectively).
Figure 3 is a representative SEM image of Zr2(Al0.42Bi0.58)C grains (composition checked by EDX on this precise location). The powders consist of 2 to 10 microns agglomerates of stacked rounded platelets. Interestingly, this microstructure and grain size does not differ as a function of targeted composition (Zr2(Al0.41Bi0.59)C vs. Zr2(Al0.50Bi0.50)C) or of temperature (1150 vs. 1300 °C). SEM imaging of large areas (≈10.000 μm2) of synthesized powders reveals that such agglomerates represent a vast majority of the volume (around 90 vol.% for 1150 °C Zr2(Al0.41Bi0.59)C), which suggests the samples consist mainly of Zr2(Al0.42Bi0.58)C. Again the synthesis temperature was found to have little effect on sample phase composition and the only actual difference, revealed by XRD (Fig. 2) and SEM/EDX between 1150 and 1300 °C is the nature and relative ratios of the detected secondary phases (ZrC, Zr5Al4, ZrAl2).
Density functional theory calculations
Nine stoichiometries were considered for DFT calculations: x = Bi/(Al + Bi) = 0, 0.25, 0.34, 0.41, 0.50, 0.59, 0.66, 0.75 and 1. The formation enthalpy of all nine stoichiometries was calculated from the constituent elements, as described in the methodology. The formation enthalpy of the Zr2AlC compound was calculated to be −0.40eV and the formation enthalpy of the Zr2BiC was calculated to be −4.17eV. Both are negative indicating that they are more stable compared to their constituent compounds (Zr + C + Al or Bi). The formation enthalpies for all stoichiometries are reported in Fig. 4. For Zr2(Al1−xBix)C solid solutions, the formation enthalpies are close but however all slightly inferior to the values expected considering a proportionality between Zr2BiC and Zr2AlC end-members values.
The mixing enthalpies of the compounds (mixed from a stoichiometric combination of Zr2AlC and Zr2BiC) are now discussed. As can be ascertained from Fig. 5, all mixing enthalpies of the considered stoichiometries are negative. Therefore DFT calculation predicts that quaternary Zr2(Al1−xBix)C will be formed preferably rather than a mixture of Zr2AlC and Zr2BiC, at least for the considered x range (0.25 ≤ x ≤ 0.75). This is in agreement with our experimental results finding formation of Zr2(Al0.42Bi0.58)C over Zr2AlC + Zr2BiC.
Another relevant piece of information from DFT calculations is that amongst each series of ten Zr2(Al1−xBix)C simulation boxes, the Al and Bi starting repartitions are random but different. In spite of this, there is no outlier and the dispersion of obtained results is low (this is evidenced by the low dispersion obtained in Fig. 5, ~ ± 0.01 eV per unit cell). This implies Al and Bi repartition do not seem to have any importance on the structure stability and therefore suggests that the relative higher stability of Zr2(Al1−xBix)C with 0.25 ≤ x ≤ 0.75 over the other compositions is presumably not experimentally achieved through an ordering of the two A elements.
The mixing enthalpy values are close one to another and Fig. 5 therefore does not help in understanding why the x = 0.58 composition appears to form experimentally over other stoichiometries. Further analysis of the data produced by DFT calculations may however give some hints on the origin of the enhanced stability of Zr2(Al0.42Bi0.58)C and conversely explain the non-stability of the end-members. The following paragraphs and Figures therefore aim to present the evolution of some relevant features observed in the simulations.
Figure 6a presents the evolution of unit cell parameters determined by the ab initio calculations. The a lattice parameter monotonically increases as a function of x (from Zr2AlC to Zr2BiC, a increases by 4.5%). In other words, the C-C (first neighbors) distances and therefore the (0001) plane of the unit cell (Fig. 1) are proportionally expanding with Bi incorporation. The c parameter variation is quite different as the maximum c lattice parameter is obtained for x = 0.59, i.e. the experimentally most stable composition (Zr2(Al0.42Bi0.58)C), then unexpectedly drops between x = 0.75 and 1 for a reason that is explained later in this paper. The difference between the maximum and minimum c values (at x = 0.59 and x = 1 respectively) is of 1.0%, therefore 4.5 times less than a maximum variation, meaning that changes in the A element size and nature mainly impact the a lattice parameter. Figure 6b shows that the unit cell volume increases with Bi incorporation, as expected by the larger size of Bi compare to Al. The cell volume increases proportionally to x and follows rather well Vegard’s law (i.e. the proportional variation between the two end-members).
In Fig. 7 the evolution of first neighbors Zr-C distances are reported. An important decrease is first seen between Zr2AlC and Zr2(Al0.75Bi0.25)C. It is expected by the incorporation of larger Bi atoms (Bi metallic radius is 1.70 Å, Al is 1.429 Å) which expands the A layer in the structure therefore compressing the Zr2C blocks. For the quaternary compositions it is seen that the Zr-C distances are increasing by 0.8% between x = 0.25 and x = 0.75. Therefore the increase in incorporation rate of larger Bi into the structure is found by DFT calculations to be accompanied by a relaxation of the Zr-C bonds. At the same time the c lattice parameter is calculated to be little impacted by Al substitution by Bi, while a is greatly increased (+0.26% and + 2.0% in the same interval for a and c, respectively). It is thus concluded that for the treated quaternary compositions, the increase in incorporation rate of Bi is accommodated through a compression of the Zr-C layers along the c-axis itself mostly relaxed by an expansion along the (0001) plane.
Figure 7 also reveals the Zr-C distances for Zr2BiC are far greater than those of the quaternaries (+4%). In view of the lattice dimensions evolution reported in Fig. 6, this result was quite unexpected. Such steep variation of property between Zr2(Al0.25Bi0.75)C and Zr2BiC was also found when drawing up and comparing the density of states (DOS) (Fig. 8). While the DOS of the quaternary compositions are similar to each other and are typical of those of other 211 MAX phases 1,32, that of Zr2BiC has little or no electron density at the Fermi level, creating a pseudogap (Fig. 8). This implies that the bonding nature between Bi and Zr is abnormally more covalent and less metallic than in most of the other MAX phases, including the quaternary systems for which somehow the replacement of ¼ of the Bi by Al prevents most if not all of such high covalence of the Zr-A bond. As a consequence of the enhanced Zr-Bi covalence in Zr2BiC, the Zr-Bi bond shrinks and so does the structure along the c-axis, retrospectively explaining the drop in c observed in Fig. 6a between x = 0.75 and 1. A similar set of features (DOS and c lattice parameter) has been previously encountered and reported by Barsoum32 for Ti2SC and given the relatively low c-parameter of Zr2SC, the latter should be part of this small group of outliers. Even if this atypical most-stable state found by the DFT calculations does not explain why Zr2BiC appears experimentally non-synthesizable contrary to Zr2(Al0.42Bi0.58)C – Ti2SC is a living proof that a peculiar bonding structure can be (meta-)stable – it however presumably proves that the better stability of the quaternary compositions compared to Zr2BiC arises from Al presence precluding Bi to lose its metallic characteristic.
Discussion and summary
At this point the question is “Why can we produce a quaternary Zr2(Al1−xBix)C while we seemingly cannot produce any of the two ternary end members?” And following this, we can also wonder “What is so special about Zr2(Al0.42Bi0.58)C composition so that this later forms over other stoichiometries?” With the results available, this second question can hardly be answered. Aside from the fact that DFT calculations along a compositional range are rarely finding exactly the same threshold tipping values as the ones found in real experiments, none of the DFT-derived results clearly highlight a particular behavior for a certain x value in the 0.25 ≤ x ≤ 0.75 range. The only notable point is that the lowly varying c lattice parameter is maximum for Zr2(Al0.41Bi0.59)C suggesting the experimental selection of the x = 0.58 stoichiometry may be driven by steric considerations.
About the apparent non-stability of Zr2AlC and Zr2BiC while Zr2(Al0.41Bi0.59)C is stable, this is actually a more wide open question, since despite many efforts 1,33, we still lack a comprehensive picture of what is driving ternary and a fortiori quaternary MAX phases’ stability. That is, advanced DFT calculations can predict fairly well whether a MAX phase is stable or not and whether it will form over competing phases or not if the formation enthalpies of these competing phases are also calculated1,23,24,25,33. DFT and other experimental data comparison also pointed out c/a ratios, valence electron concentration1 and shear modulus/bulk modulus ratio33 are likely to be key parameters regarding stability but however at the current stage, all these DFT related works have not been able to elicit a simple and universal predicting rule from constituting elements characteristics such as e.g. ionic radius or c/a ratios. Once again a presumable main part of the problem should be that a MAX phase existence does not only depend on its own structural stability but also on that of all possible competing phases24,25.
In the present case, the simplest possible answer to the first question obviously is that Zr2AlC and Zr2BiC are structurally less stable than the combination of phases experimentally obtained (Table 1). Nonetheless it is also likely that the experimental formation of a MAX phase can be precluded because of a disadvantageous combination of onset temperatures of formation (Tf) and of decomposition (Td) and potentially of the associated kinetics (kf and kd) of the two reactions. As discussed before in this paper, Tf and Td are often close for Zr2AC MAX phases4,28. It is then possible we do not obtain either Zr2AlC or Zr2BiC because Td Tf or because Td ≈ Tf but for the tested temperatures kd kf. Whatever the reason for the experimental absence of Zr2AlC and Zr2BiC although nothing from DFT works directly suggests a non-stability34,35,36,37, the quaternary Zr2(Al0.42Bi0.58)C somehow produces an enhanced structural stability, which results in rendering the formation of the MAX phase more energetically favorable than competing phases and/or in favorably changing the T and k above-defined values, so that formation takes over decomposition. As it can be simply seen with a periodic table and the list of so far synthesized MAX phases, expectations about Zr2AlC stability (at least compared to ZrC + ZryAlz) have to be low since none of the Al neighbors (Si, Ga and Ge) forms a Zr2AC MAX phase4,27,28,29,30,31. Conversely some of Bi neighbors forms a Zr2AC MAX phase (A = Pb, Sn). That and the lower formation enthalpy of Zr2BiC compared to Zr2AlC (Fig. 4) strongly suggests Bi presence is stabilizing the MAX structure. However, too much Bi (or too little Al) was predicted by DFT to render Bi much more covalent in Zr2BiC than usually seen in MAX phases. This difference of Bi behavior in Zr2BiC compared to Zr2(Al1−xBix)C (0.25 ≤ x ≤ 0.75) is therefore likely to be directly or indirectly responsible for the apparent non-stability of Zr2BiC although Zr2(Al0.42Bi0.58)C is experimentally stable.
In summary, the present study has considered the synthesis of Zr2(Al1−xBix)C MAX phases. It is determined here that Zr2(Al1−xBix)C and especially Zr2(Al0.42Bi0.58)C forms in contrast to Zr2BiC and Zr2AlC that seemingly do not. DFT supports the experimental results as there is significant mixing enthalpy decrease when considering the Zr2(Al1−xBix)C MAX phase with respect to the end-members. This also demonstrates that an intermediate 211 MAX phase can form without the end members forming. If Zr2AlC is most probably “simply” unstable or less stable than competing phases (ZrC + ZryAlz), Zr2BiC experimental non-stability may stem from an increase in Bi covalence strength for high Bi contents, as observed in DFT calculations. The inclusion of Bi is a significant extension of the MAX phase family and this should lead to further investigation of its material properties and technological applications. As an example, Zr2(Al0.42Bi0.58)C may be a possible precursor for Zr2C MXene synthesis.
Methods
Experimental methods
Zirconium dihydride (ZrH2, Alfa Aesar, −325 mesh, >99.7%), bismuth (Alfa Aesar, −325 mesh, >99.5%), aluminium (Alfa Aesar, −325 mesh, >99.5%) and graphite (Sigma-Aldrich, −500 mesh, >99.9%) were used as reactants. To limit as much as reasonably possible oxygen impurities, the reactants were kept and weighed in Nylon milling jars filled with 10 mm ZrO2 balls in an Argon glove box. The jars were sealed and placed for 30 mins at 360 rpm in a rotary mill (Nanjing University Instrument Plant). The mixed powders were then transferred in the glove box, sealed in plastic bottles and kept in these bottles up until synthesis reaction. As is the custom for most MAX phase syntheses, stoichiometries were experimentally adjusted to 2/1.05/0.95 for Zr, Al + Bi and C, respectively. This is in order to compensate for the usual partial sublimation of the A element(s) and the possible partial uptake of carbon from the employed graphite crucibles and dies. Reactions were done by pressureless heating of the powders. Minutes before the thermal treatment, the sealed Ar-filled bottles were opened and poured in graphite crucibles (custom-made by Almath Crucibles Ltd., UK) which were then placed in a furnace under argon (FCT Systeme HP W/25/1, Rauenstein, Germany). Three different synthesis temperatures were tested: 1450 °C (1 h plateau), 1300 °C (10 h) and at 1150 °C (10 h). Heating and cooling rates were set at ~20 °C.min−1. The obtained compounds were then analysed by XRD using a Bruker D2 Phaser SSD160 (Karlsruhe, Germany). Routine analyses consisted of 6 to 105o 2θ scans with a 0.03o 2θ step and 0.4 sec.step−1. Crystalline phase determination was done with the help of Xpert High Score Plus software using ICDD (International Centre for Diffraction Data) database. As Zr2BiC and Zr2AlC are obviously not reported in the database Zr2PbC and Zr2SC were used as references for tentative matching. Similarly, the presence of higher order MAX phase (n = 2 or 3) was ruled out by comparison with simulated patterns using Crystal Maker and Crystal Diffract software. Refinement of unit cell parameters was done by full-pattern matching (Le Bail function) using the Fullprof Suite program38. The powder obtained after 1300 °C synthesis of Zr2(Al0.5Bi0.5)C was manually milled in an agate mortar and underwent a <250 μm sieving to be used for SPS sintering. This was done at Nanoforce lab., Queen Mary University of London, using a HP D/25/1 FCT System equipment and 30 mm graphite cylindrical mold jacketed with graphite paper. Sintering was done at 1300 °C during 10 minutes, this temperature being reached in about 10 minutes. SEM imaging and EDX analyses were performed at 20 keV using a JEOL SEM 6400 equipped with an INCA detector (ultra-thin polymer window, Oxford Instruments, Oxford, UK).
Computational methods
DFT calculations were performed on the Zr2(Al1−xBix)C system using the VASP program. The GGA-PBE exchange correlation was used with pseudopotentials available in the library distributed with the VASP program39 (using the highest valence electron version available). Calculations were carried out in a 4 × 4 × 1 supercell (unit cell displayed in Fig. 1), containing 32 formula units (128 atomic sites). A 4 × 4 × 4 γ-centered k-point grid was utilized for all calculations providing a spacing of 0.02 Å−1. A Methfessel-Paxton smearing method was used for all calculations with a smearing width of 0.15 eV. All calculations were performed under constant pressure, allowing all atomic positions, lattice parameters and angles to fully relax. The DOS of each system was modelled from the fully geometry optimized state.
Complete random mixing on the A sublattice was investigated by randomly populating Bi and Al species over the 32 available lattice sites. Seven different deviations in stoichiometry were investigated, namely: x = 0.25, 0.33, 0.41, 0.50, 0.59, 0.66 and 0.75 (in Zr2(Al1−xBix)C). Ten random supercells of each stoichiometry were generated and relaxed using the method described. The standard deviation in energy was less than 0.02 eV/per Zr2(Al1−xBix)C unit.
Formation enthalpies Hform were calculated from the constituent elements (i.e. Zr metal, Al metal, Bi metal and C). The mixing enthalpy Hmix was subsequently calculated from these values, to highlight any preferred stoichiometry that forms as an intermediate composition (negative deviations of mixing enthalpies highlight a preferential system stoichiometry).
Additional Information
How to cite this article: Horlait, D. et al. Synthesis and DFT investigation of new bismuth-containing MAX phases. Sci. Rep. 6, 18829; doi: 10.1038/srep18829 (2016).
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Acknowledgements
Ben Milsom and Salvatore Grasso are acknowledged for their help in the access and use of Queen Mary University London equipment. A.C. is grateful for funding from the Lloyd’s Register Foundation, a charitable foundation helping to protect life and property by supporting engineering-related education, public engagement and the application of research. D.H. thanks the EPSRC for funding through the XMat grant (EP/K008749/1). Calculations were undertaken with the assistance of resources provided at the NCI National Facility systems at the Australian National University through the National Computational Merit Allocation Scheme supported by the Australian Government. This work was also supported by the Multi-modal Australian ScienceS Imaging and Visualisation Environment (MASSIVE).
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D.H. performed the experiments and S.C.M performed the calculations. A.C. and W.E.L. helped analysing the results, contributed to the discussion and managed the funding of the work.
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Horlait, D., Middleburgh, S., Chroneos, A. et al. Synthesis and DFT investigation of new bismuth-containing MAX phases. Sci Rep 6, 18829 (2016). https://doi.org/10.1038/srep18829
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DOI: https://doi.org/10.1038/srep18829
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