DOI:
10.1039/D3MA00813D
(Paper)
Mater. Adv., 2024,
5, 3751-3770
AlSi10Mg hollow-strut lattice metamaterials by laser powder bed fusion
Received
6th October 2023
, Accepted 10th March 2024
First published on 19th March 2024
Abstract
Hollow-strut lattices (HSLs) with submillimetre-diameter hollow channels are emerging lightweight multifunctional metamaterials. High-strength aluminium alloys are highly attractive as hollow-strut materials due to their low density, cost efficiency, and corrosion resistance. However, their laser powder bed fusion (LPBF) is more challenging than commonly examined metal alloys like Ti–6Al–4V for three fundamental reasons. Aluminium alloys observe (i) large volume shrinkage from the high melt pool temperature to room temperature, (ii) high reflectivity and thermal conductivity necessitating higher laser energies, while also having a (iii) low liquidus temperature (557 °C) creating a dynamic melt pool. These factors imply that AlSi10Mg has a high likelihood of geometric defects and powder occlusion through the hollow channels. This work investigates the LPBF manufacturability of AlSi10Mg HSLs and their mechanical properties. High-fidelity LPBF-manufactured AlSi10Mg hollow-strut channel diameters, wall thicknesses, and scan strategy are identified. Compression testing reveals that as-fabricated AlSi10Mg HSLs reach the empirical upper limit of the Gibson–Ashby model for relative yield strength, while solid-strut lattices (SSLs) of Ti–6Al–4V, AlSi10Mg, and SS316L with comparable relative densities are normally below it. Furthermore, their absolute yield strengths are remarkably comparable to SSLs, even with much lower absolute densities. Finally, their failure modes are analysed and assisted with numerical simulations. AlSi10Mg HSLs are lightweight, cost-effective, and structurally efficient metamaterials.
1. Introduction
Inspired by lightweight and durable natural cellular materials like coral,1,2 bamboo,3 and bone,4,5 metal lattice metamaterials are manufactured cellular materials consisting of interconnected struts, plates, shells or their mixtures, usually organized in repeating unit cells with pore sizes ranging from millimetres to submillimetre.6 They have already found important niche applications in aerospace,7,8 automotive,9,10 biomedical,11,12 and thermal engineering13,14 as either freestanding components or part of a hybrid assembly (e.g., conformal lattice components15,16). Their fabrication is now predominantly achieved through laser powder bed fusion (LPBF) additive manufacturing (AM). As an emerging class of novel lightweight multifunctional materials, they will continue to attract significant research attention and find new applications as LPBF AM continues to advance.
Hollow-strut lattice metamaterials, as the name implies, consist of interconnected hollow struts rather than solid struts. Initially, hollow-strut lattices (HSLs) were manufactured with a multistep approach using lattice topology polymer templates17–20 that were coated with metal or ceramic21–24 before the template was etched25–27 leaving the hollow topology. However, this multistep approach was inefficient and geometrically restrictive. Consequentially, with the introduction of increasingly mature LPBF AM technologies, hollow-strut metal lattice fabrication has evolved rapidly.28–36 This evolution has enabled a recent systematic assessment of titanium alloy (Ti–6Al–4V) hollow-strut lattice metamaterials,28–32,37,38 which exhibited much higher structural efficiency than solid-strut lattices (SSLs). The Ti–6Al–4V alloy was chosen for two main reasons, it offers (i) excellent LPBF manufacturability and (ii) high strength, medium density, and a range of unique properties, including being the implant alloy of choice.39
While the above developments are encouraging, Ti–6Al–4V hollow-strut lattice (HSL) metamaterials do not always provide the best solution for non-biomedical applications at room temperature (RT). This is because Ti–6Al–4V alloy powder remains expensive. In addition, Ti–6Al–4V has a density of 4.43 g cm−3. Accordingly, it is logical to consider some high-strength aluminium (Al) alloys such as AlSi10Mg, which provides a compromise between mechanical strength, lower density (2.7 g cm−3), and a reduced cost while still offering high corrosion resistance.40 Corrosion resistance is particularly important because the wall thickness of these hollow struts is typically in the submillimetre range. To date, no experimental studies have been found on LPBF of AlSi10Mg HSLs.
Compared with the LPBF of Ti–6Al–4V HSLs, the LPBF of AlSi10Mg HSLs faces additional significant challenges. The density of AlSi10Mg increases substantially from about 1.8 g cm−3 at the melt pool temperature (in the range of 1700–2800 °C41–44) to 2.67 g cm−3 at RT,45 which corresponds to a volume shrinkage of 33%. In contrast, when cooled from the same melt temperature (2400 K) to RT, based on the density of molten Ti–6Al–4V46 and its RT density (4.43 g cm−3), the volume shrinkage is only 9.94% (10.56% for commercially pure Ti47,48). This challenges the fabrication of uniform submillimetre-wide hollow channels with submillimetre-thick walls. Furthermore, the high reflectivity and thermal conductivity of Al powder, in contrast to Ti powder results in a substantial portion of laser energy being reflected and rapid heat conduction away from the melt pool. These properties necessitate higher laser energies for optimal powder melting and stable melt pool formation.49,50 However, the use of elevated laser energies with Al powder induces a dynamic melt pool, driven partly by its low liquidus temperature (557 °C for AlSi10Mg45), leading to a higher likelihood of defects, especially for single laser scan paths.40 The heightened thermal conductivity of Al powder also requires greater energy input compared to materials with lower thermal conductivity. Consequently, melt pool tracks using Al powder would be significantly wider than those with Ti powder under equivalent energy input, as heat disperses and melts nearby powder,49,50 preventing the same range of wall thickness attainable with the LPBF of Ti–6Al–4V.
Another issue is related to the low liquidus temperature of AlSi10Mg (557 °C45), compared to the high liquidus temperature of Ti–6Al–4V (1605 ± 10 °C for ref. 51). As a result, AlSi10Mg alloy powder is easy to sinter and/or melt both in the hollow channels and on the external unit cell profile even at temperatures below 500 °C (low silicon commercial Al alloys are usually sintered at temperatures close to 600 °C52). Consequently, powder occlusions are easy to occur in these narrow hollow channels, and external powder adhesion can also easily develop as powder collects in corners of the unit cell topology. This is further exacerbated by Al powder generally observing poor powder flowability compared to Ti powders.49,50 The manufacture of intricate AlSi10Mg HSLs by LPBF thus requires methodological design considerations including the laser scan strategy.
The purpose of this study is therefore three-fold: (i) to introduce the AlSi10Mg alloy into the LPBF hollow-strut lattice space, (ii) to establish the LPBF manufacturability guidelines for high-fidelity fabrication of AlSi10Mg intricate HSLs, and (iii) to evaluate the mechanical properties of AlSi10Mg HSLs and identify their failure modes both experimentally and numerically. Answering these questions will contribute to an objective assessment of the potential of AlSi10Mg HSLs for lightweight engineering as an alternative to Ti–6Al–4V solid-strut and hollow-strut lattice metamaterials in appropriate conditions.
2. Method and materials
2.1. Design of AlSi10Mg HSLs
Face-centered cubic (FCC) and FCC with Z-struts/load-aligned struts (FCCZ) unit cell topologies were fabricated for this study (Fig. 1). These unit cell topologies were chosen by considering the solid-strut lattice literature that observes high compliance and low strength for the FCC topology, versus high stiffness and high strength for the FCCZ topology.53 Furthermore, FCC and FCCZ lattices do not contain unsupported horizontal struts, making their LPBF fabrication much easier when compared to complex topologies like the octet truss.33
|
| Fig. 1 Hollow-strut lattice models for (a) FCC and (b) FCCZ topologies. (c) FCC_1B, (f) FCCZ_1B, (d) FCC_2B, (g) FCCZ_2B, (e) FCC_3B, and (h) FCCZ_3B. The blue coloration indicates hollow-strut walls while the light red coloration characterizes the internal profiles. ΔD: wall thickness. | |
Table 1 summarizes the geometrical parameters for the AlSi10Mg hollow-strut lattice designs of this study. The number of cells is 6 × 6 × 6 (along the x, y, and z directions). This cell arrangement was chosen to be directly comparable to Ti–6Al–4V FCC and FCCZ HSLs,30 and solid-strut strut lattices. According to a recent literature review,53 six cells in each direction can be considered as an average cell number used by researchers. The cell size is fixed at 5 × 5 × 5 mm3, with a pore size of 3.5 × 3.5 × 3.5 mm3. The lattice dimensions by design are 31.5 × 31.5 × 31.5 mm3. The outer diameter (d) of each lattice hollow strut is 1.5 mm for both 45°- and 90°-inclined struts. This outer diameter is fixed for all designs.
Table 1 Geometrical parameters of AlSi10Mg HSLs
Unit cell type |
Number of border scansa |
Wall thickness (mm) |
Strut outer diameter (mm) |
Unit cell size (mm) |
Cavity size (mm) |
Strut incline (°) |
Number of cells (x,y,z) |
Lattice size (mm) |
Relative density (%) |
Refer to the subsequent Fig. 2 for the implications of the number of border scans 1B, 2B, and 3B.
|
FCC |
1B |
0.24 |
1.5 |
5 |
3.5 |
45 |
(6,6,6) |
31.5 |
11.4 |
FCC |
2B |
0.39 |
1.5 |
5 |
3.5 |
45 |
(6,6,6) |
31.5 |
16.9 |
FCC |
3B |
0.54 |
1.5 |
5 |
3.5 |
45 |
(6,6,6) |
31.5 |
20.7 |
FCCZ |
1B |
0.24 |
1.5 |
5 |
3.5 |
45, 90 |
(6,6,6) |
31.5 |
13.7 |
FCCZ |
2B |
0.39 |
1.5 |
5 |
3.5 |
45, 90 |
(6,6,6) |
31.5 |
20.6 |
FCCZ |
3B |
0.54 |
1.5 |
5 |
3.5 |
45, 90 |
(6,6,6) |
31.5 |
25.5 |
Three inner channel diameters or wall thicknesses are considered. Our previous experimental studies found that for LPBF of Ti–6Al–4V hollow struts, to avoid powder occlusion, the minimum inner channel diameter should not be less than 4Dv(90).34 Since the LPBF of AlSi10Mg hollow struts is expected to be more challenging than that of Ti–6Al–4V hollow struts, we chose a minimum inner channel diameter of 6Dv(90) in our design. The other two inner channel diameters are chosen to be 10Dv(90) and 15Dv(90). The Dv(90) of the AlSi10Mg powder used in this study from SLM Solutions is 67.41 μm. These design considerations lead to our final designs described in Table 1 (three wall thicknesses: 0.24, 0.39, and 0.54 mm for both FCC and FCCZ lattices). The relative density varies from 11.4% to 25.5%. Fig. 1 displays each design listed in Table 1.
2.2. LPBF manufacture and powder material
An SLM Solutions 500HL system was used to fabricate all designs. The substrate material is aluminum alloy 5083. No support structures were used. The LPBF parameters were determined after a series of preliminary assessments, where AlSi10Mg standalone walls were first fabricated at laser scan speeds of 550–900 mm s−1 and laser powers of 150–250 W. Examining these walls using a Keyence VHX optical microscope determined that the laser power of 200 W and scan speed of 750 mm s−1 were optimum in geometrical consistency and structural stability. Table 2 lists the LPBF parameters chosen for this work, in line with an extensive study of the AlSi10Mg alloy using the SLM Solutions LPBF systems for solid-strut AlSi12Mg lattices.54 Importantly, the application of a zero-focus offset was pivotal in order to fabricate HSLs with the thinnest walls possible by LPBF.55 After fabrication, the lattice specimens were cooled in the powder bed to room temperature.
Table 2 LPBF parameters implemented to fabricate AlSi10Mg HSLs
Spot size (μm) |
Laser power (W) |
Layer thickness (μm) |
Scan speed (mm s−1) |
Platform temperature (°C) |
Focus offset (μm) |
Single scan path width (μm) |
Number of samples |
80 |
200 |
30 |
750 |
150 |
0 |
∼240 |
12 |
Spherical nitrogen-gas atomized AlSi10Mg powder supplied by SLM solutions was utilized. The main composition is Al–9.79Si–0.35Mg–0.11Fe (wt%), of which Cu, Mn, Cr, Ti, Ni, Mn, Sr, Zr, Sn, Pb, and Zn are each <0.01% and the other total is <0.15%. The powder has Dv(10) = 27.59 μm, Dv(50) = 43.08 μm, and Dv(90) = 67.41 μm. The theoretical density of ASi10Mg is taken as 2.67 g cm−3.53
2.3. Laser scan strategy
To fabricate these HSLs a constant border laser scan strategy was implemented, as it achieved success in Ti–6Al–4V hollow-strut lattice fabrication.30Fig. 2 shows the basic principles for the creation of each hollow strut with different inner diameters and wall thicknesses. The process starts from the same solid-strut STL file with the designed outer diameter (Fig. 2(1)) via different border scan paths (Fig. 2(2)) to create inner hollow channels with the designed wall thicknesses and diameters. It focuses on wall thickness where the scan paths always follow the slice contour without using the conventional hatching strategy. This strategy has proved effective for Ti–6Al–4V,30,33,34 but it has not been subjected to serious assessment in the fabrication of AlSi10Mg HSLs. It should be emphasized that the exact number of border scans can only be determined by experiments in relation to the wall thickness or channel diameter by design.
|
| Fig. 2 LPBF of submillimeter hollow channels (schematic). Step 1: solid-strut STL file with the designed outer diameter (1.5 mm, orange). Step 2: formation of a hollow-strut geometry with different inner diameters or wall thicknesses through three laser scan strategies (red lines) including; single border scan (1B), double border scans (2B), and triple border scans (3B), where red is the scan path. Step 3: manufactured hollow strut cross-sections (blue). | |
As shown in Fig. 2, three laser scan strategies, namely single border scan (1B), double border scans (2B), and triple border scans (3B), are implemented. To achieve high-fidelity LPBF, each border scan is positioned inwards by 120 μm, to account for the width of the melt pool. Since the minimum wall thickness is 240 μm (for 1B), and the offset used between consecutive border scans is 150 μm (Fig. 2), the wall thickness is predicted to be 390 μm (for 2B), and 540 μm (for 3B).
2.4. Manufacturability characterization
A Bruker SKYSCAN X-ray microfocus computed tomography (μCT) machine was employed to examine the external and internal geometries of the hollow lattice struts. The operational parameters are listed in Table 3. One lattice specimen from each design in Table 1 was analyzed in detail by μCT. The nRECON shadow image reconstruction software (Bruker Pty Ltd) was used to reconstruct the cross-sectional slices acquired from the μCT angular projections through the object. The external and internal features were examined systematically layer by layer from the reconstructed lattice digital twins. To evaluate the mass and subsequent density, each hollow-strut lattice was weighed on a Digitech electronic scale with an accuracy of 0.001 g. To assess the fractography of the hollow-strut lattice specimens following compression testing, struts, and nodes were sectioned from the lattice and analyzed with scanning electron microscopy (SEM) using an FEI Quanta 200 SEM machine. An acceleration voltage of 30 kV and spot size of 5.0 μm were applied during the SEM.
Table 3 μCT parameters implemented for characterizing HSLs
Geometry |
Source voltage (kV) |
Source current (μA) |
Voxel size (μm3) |
Rotation α (°) |
Rotation step α (°) |
Filter |
Hollow-strut lattice |
60 |
100 |
25 × 25 × 25 |
360 |
0.2 |
Aluminium 1-mm thick |
2.5. Mechanical characterization
Quasi-static uniaxial compression was applied to the lattices to experimentally study their deformation behaviours and attain their mechanical properties. The samples were tested on an MTS 100 kN machine at room temperature. A strain rate of 1 × 10−3 s−1 was used according to the ISO standards.56 The lattice failure modes were recorded through progressive images taken by a high-speed camera at two-second intervals. The data output from this test provided a force versus displacement graph. The force was converted to stress by dividing against the lattice cross-sectional area in the XY plane prior to testing. The strain was calculated by dividing the displacement against the original lattice height (Z plane). To determine the unloading elastic modulus, the lattices were unloaded at both 2% and 4% strain to 0 MPa stress and subsequently loaded again while the samples remained in their elastic region.
To assess the structural efficiency of the AlSi10Mg HSLs on the basis of architecture instead of material, their mechanical data was converted to relative density (ρ*/ρs), relative elastic modulus (E*/Es), and relative yield strength (σ*/σs) and plotted upon the Gibson–Ashby (G–A) model.57 The relative values, eliminate the material effects, by dividing the reported lattice property (denoted by superscript “*”) by the constituent bulk material property (subscript “s”). To calculate the relative properties, and also for numerical analysis, the density, yield strength, and elastic modulus of bulk LPBF AlSi10Mg are taken as 2.67 g cm−3,53 240 MPa58–60 and 70 GPa,53 respectively. Since the material properties depend on build orientation,58–60 these values can be treated as averages. We have used the datasets from two solid-strut lattice review papers to assess the efficiency of the manufactured hollow-strut lattice specimens.53,61 To ensure the datasets are up to date, we have divided the SS316l, Ti–6Al–4V, Inconel 625, and AlSi10Mg SSLs against recently reported LPBF datasheets for each respective material.62–67
2.6. Numerical modelling
The finite element method (FEM) was conducted to assess 1 × 1 × 2 lattices of the idealised CAD hollow-strut FCC and FCCZ topologies. The linear elastic FEM models were designed specifically to explain the internal and external stress distributions through the HSL topologies prior to yielding under compression, not to validate the mechanical property data measured from the lattice samples.
The FEM assessment was conducted using the CATIA V6 advanced structural analysis tool (Dassault Systèmes 2020), with an isotropic elastic continuum material model for LPBF-printed AlSi10Mg.68 Tetrahedral continuum elements were implemented with an element size of 0.195 mm to achieve a high sensitivity mesh with 2.5–2.6 × 105 elements. These parameters were chosen following a systematic mesh sensitivity study conducted with the maximum translation displacement values from FCC and FCCZ FEM models of varying element sizes. This assessment was designed to balance mesh sensitivity and computational time, however, a high displacement convergence (>90%) was still maintained for both the FCC and FCCZ hollow-strut lattice FEM models. The lattices were placed between two plates to evenly distribute the load. A compressive unit load of 100 N was applied to the upper surface of the plate, with translational restraints to prevent distortion in the upper plate. Furthermore, a fixed vertical boundary condition was placed at the bottom plate.
3. Manufacturability of AlSi10Mg HSLs
3.1. FCC HSLs
To assess the quality of the LPBF-fabricated FCC AlSi10Mg HSLs, each scan strategy was evaluated using μCT. The middle column of Fig. 3 shows the FCC HSLs reconstructed from the μCT data, where the resulting wall thicknesses (ΔD) are 240 μm from the single border scan (1B), 390 μm from the double border scans (2B), and 540 μm from the triple border scans (3B). Each reconstructed μCT lattice specimen was inspected layer by layer both horizontally and vertically. High manufacturable consistency was observed from each scan strategy. To display the structural details, the left-column images in Fig. 3 show horizontal cross-sections captured at the height of 18.25 mm in each lattice, while the right-column images are vertical cross-sections captured at a width of 15.75 mm from a side surface of each lattice. Specific sectional features are highlighted in Fig. 3 using small rectangles.
|
| Fig. 3 μCT characterization of LPBF-fabricated AlSi10Mg HSLs. (a) FCC_1B, (b) FCC_2B, and (c) FCC_3B. Left column: horizontal cross-sections at the height of 18.25 mm from each reconstructed lattice (middle column). Right column: vertical cross-sections from a width of 15.75 mm for a side surface of each reconstructed lattice. 1B, 2B, and 3B: single, double, and triple border scans. ρRD: lattice relative density. ΔD: wall thickness. The red rectangles highlight hollow strut defects. The green rectangle displays a uniform hollow cross-section. The blue rectangles underline powder occlusion in narrow channels. | |
The following observations are most notable from the systematic μCT characterization.
A. Compromised LPBF fabrication (FCC_1B, Fig. 3a and 4a).
The inner channel diameter is 1020 μm by design with a wall thickness of 240 μm. The hollow struts exhibit reasonably uniform inner and outer cylindrical profiles, despite the large volume shrinkage (33%) from the high melt pool temperature to room temperature as mentioned earlier. This demonstrates the overall high shape formation capability of the LPBF process. However, there is low connectivity on the intersecting walls between the strut and node profiles at the underside of the unit cell, with clear cavities. Furthermore, the external cylindrical surfaces of the as-fabricated hollow struts exhibit a low frequency of cavities as highlighted by the red rectangles in Fig. 3a, shown as cross-sectional notches, further displaying the effect of volume shrinkage. The difficulty of using an easy to sinter and/or melt powder material like AlSi10Mg in LPBF is also clear from observing the small volume of sintered and/or melted powder adhered to the top of each node in Fig. 3a. The low density of these HSLs will be negatively impacted by this adherence, being increased with no mechanical benefit. Although the large internal channel diameter (1020 μm) ensured high powder flowability, the thin walls of the FCC_1B specimens were affected by the large volume shrinkage and are structurally unreliable. Consequently, these are failed builds.
B. Successful LPBF fabrication (FCC_2B, Fig. 3b and 4c).
For this laser scan strategy, both the internal channels and external cylindrical surfaces were fabricated with uniform geometry and high consistency in topology. A negligible frequency of deep surface cavities was observed on the external strut surfaces. The internal channels are free of powder occlusion, and unlike the FCC_1B specimens, the struts are all well connected through each node. Also, the small volume of powder adhered to the top of each external node appears to now have a negligible impact. Due to the absence of deep surface cavities, the outer surface of each hollow strut looks smoother than those in the FCC_1B lattices (Fig. 4cvs.Fig. 4a). The hollow struts in these high-quality builds have an internal channel diameter of 720 μm by design with a wall thickness of 390 μm.
|
| Fig. 4 μCT characterization of internal cross-sections, taken from the center of the first unit cell layer of each AlSi10Mg hollow-strut lattice. (a) FCC_1B, (b) FCCZ_1B, (c) FCC_2B, (d) FCCZ_2B, (e) FCC_3B, and (f) FCCZ_3B. 1B, 2B, and 3B: single, double, and triple border scans. The red rectangles and circles highlight hollow strut defects. The green rectangles display high-quality uniform hollow-struct cross-sections. The blue rectangles underline powder occlusion inside the narrow channels. | |
C. Powder-occluded LPBF fabrication (FCC_3B, Fig. 3c and 4e).
Robust LPBF fabrication with uniform external strut profiles and well-constructed lattice strut nodes were observed (Fig. 4e). However, the distinct difference is that the internal channels are frequently occluded with trapped powder as highlighted by the blue rectangles in Fig. 3c, due to the reduction in the internal channel diameter from 720 to 420 μm. The powder occlusion was also confirmed by the clear increase in the mass of the FCC_3B lattice specimens, exhibiting on average an 18% higher mass than the CAD relative density. This highlights how easily AlSi10Mg powder may sinter and/or melt to convert the hollow strut section to an almost solid strut section. It is clear that the use of the 6Dv(90) inner channel diameter is still insufficient to prevent powder occlusion for LPBF of AlSi10Mg HSLs, while the use of 10Dv(90) and 15Dv(90) inner channel diameters has ensured efficient powder removal.
3.2. FCCZ HSLs
As pointed out earlier, the difference between FCC and FCCZ unit cells is that the latter comprises four extra vertical (90°) struts (the numbers of inclined struts and nodes are the same). For PBF AM of solid struts, vertical struts are the easiest to manufacture due to their perfect additive continuity. Therefore, it was expected that vertical hollow struts would be easily manufacturable as well. This was validated by the higher average gravimetric accuracy of the FCCZ specimens (98 ± 5%) versus the FCC specimens (88 ± 4%) when compared to the CAD models. Nevertheless, the vertical struts still observed the same defects as the inclined struts although these were less common. Fig. 4 and 5 display the detailed μCT observations of the manufactured FCCZ HSLs using the same three scan strategies.
|
| Fig. 5 μCT characterization of LPBF AlSi10Mg hollow-strut lattices. (a) FCCZ_1B, (b) FCCZ_2B, and (c) FCCZ_3B. Left column: horizontal cross-sections at the height of 18.25 mm from each reconstructed lattice shown in the middle column. Right column: vertical cross-sections from a width of 15.75 mm for a side surface of each reconstructed lattice. 1B, 2B, and 3B: single, double, and triple border scans. ρRD: lattice relative density. ΔD: wall thickness. The red rectangles highlight hollow strut defects. The green rectangle displays a uniform hollow cross-section. The blue rectangles underline powder occlusion in narrow channels. | |
In general, the basic observations summarized above for FCC HSLs are all valid for FCCZ HSLs and will not be repeated. The double border scan strategy (FCCZ-2B) similarly resulted in high-fidelity successful fabrication (Fig. 4d and 5b). Special attention was therefore paid to the vertical hollow struts in each lattice. As shown in Fig. 4b and 5a (FCCZ_1B), volume shrinking also affected the geometry. For example, surface shrinkage cavities not only formed in the vertical hollow struts, but some also penetrated the wall thickness similar to Fig. 3a, indicating failed fabrication. The 240 μm wall thickness is thus insufficient for both vertical and inclined hollow struts of AlSi10Mg. The triple border scan (FCCZ_3B) resulted in powder occlusion not only in the inclined hollow struts (expected from Fig. 3c) but also in vertical hollow struts, as shown in Fig. 5c by the blue rectangles. Therefore, the 420 μm or 6Dv(90) wide internal channel is even insufficient to avoid powder occlusion in vertical struts (easier to remove powder) for AlSi10Mg. These observations confirm again that for LPBF of AlSi10Mg HSLs, it appears necessary to use 10Dv(90) wide and above inner channel diameters. No powder occlusion is an essential requirement for the design and PBF-AM of HSLs.
From the aforementioned μCT studies, the double border scan method (2B) together with the LPBF parameters selected can lead to high-fidelity LPBF of FCC and FCCZ AlSi10Mg HSLs.
4. Mechanical properties
Fig. 6a evaluates the relative yield strengths (σ*/σs) of the HSLs compared to the PBF literature data for Ti–6Al–4V, SS316L, CoCr, and AlSi10Mg SSLs via a Gibson–Ashby (G–A) plot. There are upper and lower limits for the G–A models as the empirically derived coefficients in the model expressions can vary from 0.1 to 1.0.69–72 As the limits are determined by empirically derived data, the upper limit of the G–A model plotted in Fig. 6a (with a coefficient value of 1.0) still remains difficult to reach for cellular metals, including solid-strut metal lattice metamaterials.
|
| Fig. 6 (a) Relative yield strength and (b) relative elastic moduli vs. relative density: comparison of AlSi10Mg hollow-strut lattices with solid-strut lattices of Ti–6Al–4V, Inconel 625, SS316L, CoCr, and AlSi10Mg (data source: ref. 53 and 61). (1B) single border scan (ΔD = 240 μm). (2B) double border scans (ΔD = 390 μm). (3B) triple border scans (ΔD = 540 μm). The blue and purple dotted lines indicate the upper and lower empirical limits of the Gibson–Ashby models, respectively. | |
As observed from Fig. 6a, all the AlSi10Mg HSLs of this study are positioned at the upper empirical limit of the G–A model, indicating a very high strength efficiency comparable to the strongest reported SSLs. This is an important feature of HSLs and suggests that the G–A model for relative yield strength may require recalibration for stronger hollow-strut lattice metamaterials or topologies. Fig. 6b plots the relative elastic modulus data obtained from each hollow-strut lattice as a G–A chart against the PBF literature data for SSLs. The relative elastic moduli are consistent with the historic high-performance solid-strut lattice data, indicating no unique stiffness properties arising from the hollow-strut designs. The G–A model can still well predict the relative elastic moduli of these AlSi10Mg HSLs.
Interestingly, both the FCC and FCCZ topologies follow a similar trajectory on the G–A plots, Fig. 6. When comparing the specific yield strengths, the FCC lattices were 5.2%, 10.1%, and 13.7% weaker than the FCCZ lattices for the single, double, and triple scan paths. This indicates that as the wall thickness decreases and the size of the inner node volume increases, the efficiency of the Z-struts/load-aligned struts is significantly reduced. This is especially noticeable when compared to SSLs where LPBF-fabricated Inconel 625 FCC lattices were observed as 45.9% weaker than FCCZ lattices.73 Consequentially, it is likely that unit cell topologies with load-aligned struts are less efficient than pure bending-dominated topologies in the hollow-strut lattice space, due to their inefficient distribution of stress through the structure (discussed in Section 4.1.1). This also highlights the advantage of reinforcing the hollow-strut nodes with load-aligned struts to reduce this inefficiency.31
Aside from the normal elastic modulus, the unloading elastic modulus (unloaded at 2% and 4% strain) was also quantified. As pointed out by Ashby et al.,74 measuring the unloading elastic modulus better represents the performance of a cellular structure in service. Fig. 7 compares the elastic moduli of each lattice with and without unloading. It provides an indication of how hollow-strut lattice metamaterials will behave in a functional setting that includes repetitive loading and unloading. The double and triple border scan strategies resulted in a robust response, where the samples exhibited an improved elastic modulus after loading and unloading at 2% and 4% strain. Conversely, the single border scan led to a different response, where the samples showed an improved elastic modulus after loading and unloading at 2% strain but failed to show any further improvement after loading and unloading at 4% strain. This further validates the high structural integrity of the wall thicknesses with double laser border scans.
|
| Fig. 7 Normal elastic moduli (blue) and unloading elastic moduli (yellow and grey) of AlSi10Mg FCC and FCCZ HSLs. (1B) single border scan (ΔD = 240 μm). 2B: double border scans (ΔD = 390 μm). 3B: triple border scans (ΔD = 540 μm). Error bars were not included as the standard deviation between samples was negligible. | |
Even with their challenging fabrication, the relative yield strengths of AlSi10Mg HSLs are positioned at the upper empirical limit (Fig. 6a), similar to Ti–6Al–4V HSLs.30,38 Furthermore, when comparing the correlation coefficient for each data set, the Ti–6Al–4V and AlSi10Mg HSLs observed an almost perfect correlation of R2 = 0.99 for both the FCC and FCCZ topologies. This indicates that LPBF AlSi10Mg can fabricate structurally efficient HSLs of a similar standard to LPBF Ti–6Al–4V HSLs. Considering the lower material cost of AlSi10Mg, hollow-strut aluminium alloy lattices may be considered as potential replacements for certain applications of titanium HSLs. The high correlation between the AlSi10Mg and Ti–6Al–4V specimens indicates that the structural efficiency of the HSL is topology dependent, not material dependent. This is a major advantage of comparing their relative properties (Gibson–Ashby method), as this allows the focus to be on the lattice architecture rather than the lattice constituent materials. Consequentially, any type of metal HSLs fabricated through LPBF should exhibit similar results.
Complementary to Fig. 6a and 8 focuses on the relative yield strength and absolute yield strength of the high-quality FCC_2B and FCCZ_2B AlSi10Mg HSLs compared to Ti–6Al–4V and SS316L SSLs of similar relative densities (17–20%). Although LPBF AlSi10Mg as a bulk material is weaker than LPBF Ti–6Al–4V and LPBF SS316L,75,76 the relative yield strength of the hollow-strut AlSi10Mg lattices far exceeds that of each solid-strut reference lattice metamaterial (Fig. 8a). Furthermore, their absolute yield strength is comparable to those of the solid-strut reference lattices, even with much lower absolute densities (0.48–0.52 vs. 0.74–1.33 g cm−3, Fig. 8b). Considering their low material cost, high corrosion resistance, and low density, Al alloy HSLs may be considered as potential replacements for certain applications of titanium and stainless steel SSL metamaterials.
|
| Fig. 8 Comparison of relative yield strength (a) and absolute yield strength (b) between FCC_2B and FCCZ_2B AlSi10Mg hollow-strut lattices and Ti–6Al–4V and SS316L solid-strut lattices of similar relative density (17–20%).53,54,78–82 The name of each data point on the X-axis denotes “unit cell topology, material, relative or absolute density”. Error bars were not included as the standard deviation between samples was negligible. | |
The underlying reasons for the superior mechanical properties of HSLs to their solid-strut counterparts have been discussed in recent studies.17,30,31,38 It is mainly due to their hollow strut sections that exhibit higher resistance to bending than solid-strut lattices, resulting in greater strength and stiffness. More specifically, at the same strut length and relative density, the actual strut cross-sectional area remains approximately the same for both the solid and hollow struts.77 This condition requires that:
| dSolid2 = dOuter2 − dInner2 | (1) |
where,
dSolid is the diameter of the solid strut, while
dOuter and
dInner are the outer and inner diameters of the hollow strut, respectively, and the nodal architecture is ignored.
77
Under this condition, the second moment of inertia (I) of the hollow strut (Ihollowstrut) given by eqn (2) is always greater than that of the solid strut (ISolidstrut) given by eqn (3):
| Ihollowstrut = π(dOuter4 − dInner4)/64ISolid strut = πdSolid4/643 | (2) |
| | (3) |
As a result, the strain (
ε) due to bending (
ε ∝ 1/
I) decreases at the same applied stress,
i.e., the elastic modulus increases. On the other hand, due to the increase in
I, the section modulus (
S) given
eqn (4) always increases from a solid strut section to a hollow strut section under the condition of
eqn (1).
Consequently, the resistance to bending or bending strength increases. These combined effects increase the resistance of the HSLs to yield under compression, leading to superior relative yield strength compared to SSLs.
5. Deformation response
To gain insight into the deformation behaviours and failure modes of the AlSi10Mg HSLs, the high-quality FCC_2B and FCCZ_2B HSLs were examined. Fig. 9(a and b) shows a closer inspection of their stress–strain curves in relation to their corresponding physical status obtained using a high-speed camera.
|
| Fig. 9 Failure modes and stress–strain curves. (a) The stress–strain curve for FCC_2B AlSi10Mg hollow-strut lattices. (b) Photos of lattice specimens corresponding to different deformation stages in (a). (c) The stress–strain curve for FCCZ_2B AlSi10Mg hollow-strut lattices. (d) Photos of lattice specimens corresponding to different deformation stages in (c). | |
The FCC_2B AlSi10Mg HSLs followed similar deformation behaviours commonly observed for conventional SSLs under compression.54,73 This included bending-dominated deformation with increasing loading, which generated moments at the nodes with minor nodal deformation in the initial stages (Fig. 9a and b). This deformation continued to develop with increasing loading, as indicated by the gradient softening until the first peak strength (FPS) was reached. No obvious lattice failure was observed up to this stage (blue box, Fig. 9b). The main deformation events after reaching the FPS are distortion along the 45° diagonal, which represents the maximum shear stress direction under uniaxial compression when the lattice is composed of a sufficient number of unit-cell layers (e.g. ≥5;83 it is 6 in this work). However, global fracture of the struts along the 45° diagonal (the first green box in Fig. 9b) commenced immediately after reaching the FPS, followed by intensive shear-dominated fracture along the 45° diagonal (the second green box in Fig. 9b), which corresponds to the end of the drop in FPS. Distortion occurred to most lattice unit cells by this stage, irrespective of their positions. The second peak strength recorded in Fig. 9a arises from the compression of the remaining half lattice below the 45° diagonal shown in the second green box of Fig. 9b. However, due to the prior disintegration of the lattice along the 45° diagonal, this part of the lattice deformation may only have limited value in practice.
The FCCZ_2B AlSi10Mg HSLs showed a mixed failure mode. Similarly, no visible deformation or fracture was observed in the lattice before reaching the FPS (see the blue box in Fig. 9c and d). Deformation and local fracture of strut nodes connected to the Z-axis started to occur immediately after reaching the FPS while shear deformation occurred along different directions at the same time (see the green box in Fig. 9d). However, all the nodes connected exclusively to the inclined struts exhibited much less deformation. After an initial stage of node fracture, shown as multi-dips in the stress–strain curve (the green box in Fig. 9c), a plateau strength was reached up to ∼22% compressive strain. The lattice structure then underwent pronounced nodal fracture or fragmentation along the compression direction and some shear prevalent directions, as shown in the violet box of Fig. 9d.
FCC HSLs were observed to undergo nodal deformation before global fracture through the 45° shear planes (Fig. 9). This deformation response is well documented for many lattice topologies under uniaxial compression both experimentally84–90 and numerically.54,73,84,91,92 This is because the 45° planes are where the maximum slippage can occur between the struts and nodes due to the maximum shear stress along the 45° diagonal. As for the FCCZ HSLs, the vertical struts act as column beams, which directly resist compression, while the inclined struts reinforce the vertical struts against column bending and strut hinging at the nodes. However, LPBF AlSi10Mg is not highly ductile (5–8% tensile ductility93,94), due to its high Si content, which exists as eutectic silicon crystals (the solubility of Si in α-Al is negligible). As a result, nodal fragmentation occurred at the FPS (Fig. 9c), followed by increased nodal fragmentation with increasing compressive strain to ∼8%. This differs from the deformation of solid nodes, which observes reduced stress at the core but larger stress at the node/strut interconnection points preventing fragmentation through the solid nodes.54,73
The node fracture features for FCC_2B lattices are shown in Fig. 10. Pores are common (Fig. 10a and b), as observed for other LPBF AlSi10Mg materials.93,94 According to Weingarten et al.,95 about 96% of the pores in LPBF AlSi10Mg contain hydrogen due to the moisture in the powder, which reacts with Al during LPBF, resulting in the melt pool containing absorbed hydrogen.95 In addition, the unavoidable residual nitrogen gas (atomization gas) in the AlSi10Mg powder may have also contributed to the porosity. Eliminating these pores through control of powder moisture should help to further enhance the strength and ductility of AlSi10Mg HSLs. The fractographs display limited shallow dimples in the matrix between the gas pores (Fig. 10b) and large flat fracture regions (Fig. 10c), coinciding with the low compressive strain (∼7%, Fig. 9a) observed at the FPS.
|
| Fig. 10 Nodal fracture features in FCC_2B AlSi10Mg hollow-strut lattices (a) with closer views of selected regions from (a): blue rectangle (b) and yellow rectangle (c). | |
Two types of nodal fractures were observed in the FCCZ_2B AlSi10Mg HSLs. One is the nodal fracture of the inclined struts (without connection to vertical struts), which is akin to that shown in Fig. 10, displaying a mixture of pores, limited shallow dimples, and large flat fracture regions (Fig. 11a–c). The other is nodal fragmentation as exemplified in Fig. 11d and e, which occurred in the nodes connected to the vertical struts due to them being the main load-bearing structures in the compression direction.
|
| Fig. 11 Nodal fracture features in FCCZ_2B AlSi10Mg hollow-strut lattices. (a) Nodal fracture with inclined struts (without connection to vertical struts). (b) and (c) are closer views from (a) (yellow and blue boxes). (d) Nodal fragmentation with vertical struts. (e) is a closer view of the (a) (red box). | |
6. Finite element modelling (FEM) of stress distribution
The deformation behaviour of the experimental FCC and FCCZ HSLs, shown in Fig. 9, coincides with the stress distributions characterized by the FCC_2B and FCCZ_2B 2 × 2 × 1 FEM models, exhibited in Fig. 12. The HSLs with double border (2B) scans were chosen as this laser scan strategy produced specimens most representative of the idealised CAD models.
|
| Fig. 12 Isotropic elastic continuum material FE model of double border scan (a) FCC, and (b) FCCZ unit cell responses to uniaxial compression in a 2 × 2 × 1 lattice array under varying loading conditions. | |
During initial loading, the experimental FCC lattices observed only minor node deformation from direct compressive force. However, hinging is visible in the non-axially aligned struts that comprise the FCC topology (Fig. 9b). This validates the FCC FEM results that observe stress concentrations proliferating from the regions where the struts adjoin at the node (Fig. 12a). This deformation response and the clear movement of the inclined struts indicate a bending dominated deformation response, atypical of solid-strut FCC lattices,53 but consistent with Ti–6Al–4V hollow-strut FCC lattices.30
During compression of the experimental FCCZ lattices, the nodes interconnected to the load-aligned struts were observed to ovalize and deform before the struts would observe any deformation as shown in Fig. 9d. These nodes were points of initial fracture, with the entire structure fragmenting following their deformation. This localized failure validates the stress distributions observed within the FCCZ FEM model (red circles Fig. 12b), where stress is similarly concentrated at the inner node walls connected to the load-aligned struts, before proliferating through these struts. These isolated stress concentrations could well facilitate a premature lattice failure and prevent the topology from observing a homogenous stress distribution.
The numerical analysis also provides insight into the high relative yield strength of the hollow-strut FCC specimens and the inefficient strength of the FCCZ specimens, highlighted by their consistent placement in Fig. 6a. For the FCC assessment, as highlighted in Fig. 12a, the stress is distributed from the joint regions through most of the unit cell, loading the lattice array homogenously. This distribution improves the structural efficiency (observed with the FCC topologies), as more material is applied to resist the compressive load. This hypothesis is further solidified by the internal view of the FCC FEM model during loading, which observes far less stress concentrations isolated to the inner node walls when compared to the FCCZ unit cells (Fig. 12b).
The numerical analysis of the FCCZ in Fig. 12b observes stress isolated to the node regions, and this only distributes to the load-aligned struts after the nodes are withstanding far higher stress. Consequentially, it is likely that the hollow struts will not achieve their predicted efficiency, as the nodes will reach a critical failure point far before the strut section properties may have any significant effect. This is supported by the experimental results in Fig. 9d as the nodes clearly fail while the load-aligned struts maintain their stability with minimal signs of deformation before global fragmentation. Furthermore, the inefficient stress distribution of the hollow-strut FCCZ topology results in far more zero-stress regions than the FCC topology (Fig. 12). These structural limitations culminate in the FCCZ topology failing to reach its expected potential, as observed by its placement on the Gibson Ashby model (Fig. 6a), in comparison to the FCC topology (which is traditionally weaker53).
The series of failure modes experienced by the FCCZ topology is unique to LPBF-fabricated HSLs, and it has only been reported in Ti–6Al–4V specimens with load-aligned struts so far. This indicates that their deformation behaviours are likely more topology-dependent or less material-dependent.30,31 However, more load-aligned topologies should be assessed to consolidate these claims.
7. Summary
Intricate AlSi10Mg HSLs with high-fidelity internal and external profiles and negligible trapped powder can be fabricated through LPBF by using a simple and efficient double border scan strategy. However, a minimum wall thickness of 0.4 mm to ensure high wall integrity and a minimum internal diameter of 0.7 mm to avoid powder occlusion are required.
The FCC and FCCZ AlSi10Mg HSLs exhibited high relative yield strength at the upper empirical limit of the Gibson–Ashby plot, superior to SSLs of Ti–6Al–4V, AlSi10Mg, and SS316L of equivalent relative density, while their absolute yield strength is also comparable (even with lower densities). Considering their low material cost, good corrosion resistance, and low density, AlSi10Mg HSLs are expected to find good niche applications.
When comparing the relative yield strength of the AlSi10Mg hollow-strut lattice specimens with reported Ti–6Al–4V hollow-strut lattices of equivalent topology, an almost perfect correlation coefficient of R2 = 0.99 was observed. This high correlation indicates that the high structural efficiency of the hollow-strut lattices is topology dependent not material dependent.
Author contributions
J. N.: investigation, characterization, critical analysis, compilation, draft, review. M. L.: review, supervision, critical analysis, funding acquisition. M. B.: conceptualization, critical analysis, review, supervision, funding acquisition. M. Q.: conceptualization, critical analysis, draft, review, supervision, funding acquisition.
Conflicts of interest
The authors declare that there is no conflict of interest.
Acknowledgements
This project was funded by the Australian Research Council (ARC) through DP200102666. The authors acknowledge the scientific and technical support of the RMIT Centre for Additive Manufacturing (RCAM) and the RMIT Microscopy and Microanalysis Facility (RMMF), especially the technical staff consisting of Simon Brudler, Paul Spithill, and Chaitali Dekiwadia.
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