With the development of science and technology in the past few years, nanostructures have received much attention from many researchers because of their important role in the fields of energy, environment, and production. Among them, titanium dioxide nanotubes (TNTs) have attracted extensive attention. Due to its large specific surface area, high chemical stability, excellent catalytic property, great acid, and alkaline resistance,^[1] the TNTs have been widely used in fuel cells,^[2,3] photocatalytic systems,^[4,5] energy storage devices,^[6,7] gas-sensitive sensors,^[8] pH sensors,^[9] and other fields. The main preparation methods of titanium dioxide nanotubes are the template-assisted,^[10,11] hydrothermal,^[12–14] sol–gel,^[15] and electrochemical anodization methods.^[16,17] However, the TNTs structures prepared by different methods are different from each other and thus present different performances. In order to optimize the composite performance by using TNTs as the addition, the investigation into their elastic and other mechanical properties are of great importance. For example, titanium dioxide nanotubes play an important role in mechanically enhancing bone bonding and epoxy resin.^[18,19] However, the elastic and mechanical properties of a single titanium dioxide nanotube are hard to obtain experimentally. Thus, there is still much room for studying the elastic and mechanical properties of titanium dioxide nanotubes.

Like carbon nanotubes, titanium dioxide nanotubes are made of transversely isotropic materials, so they are highly symmetrical in elastic properties and sensitive to the helicity and the radius of nanotubes.^[20–22] In order to obtain the elastic properties of TNTs effectively, the elastic constants can be calculated by density functional theory or molecular dynamics. The first principles Vienna ab initio simulation package (VASP) has already predicted the elastic constants of bulk anatase and rutile TiO₂ at 0 K,^[23,24] and the elastic constants of bulk rutile at various temperatures have been measured experimentally.^[25–27] But the elastic constants of TNTs have not been measured nor calculated yet.

In this paper, the single-cycle sheet of TiO₂ anatase (101) is curled into a single wall nanotube structure along different chiral directions. The elastic constants of the nanotubes are calculated by the Matsui and Akaogi (MA) potential function through using molecular dynamics. In order to verify the calculated results, we first use this potential function to calculate the elastic constants of bulk anatase and rutile, which demonstrate good accuracy. Then, the elastic constants of the titanium dioxide nanotubes with different chiral angles are further calculated, including Youngʼs modulus, shear modulus, and Poisson ratio. Such a prediction of the TNT elastic properties can provide good theoretical guidance for both experimental and practical applications.

Rutile is relatively stable in nature and the elastic constants of rutile are obtained experimentally. We use the MA potential function to calculate the elastic constants of bulk rutile from room temperature to 1000 K, and a fairly good agreement is found between our computed elastic constants and those from the experiments.^[25,26] (See Table 4 in Appendix A for more details). It is worth pointing out that the elastic constants gradually reduce as the temperature increases. The calculated value of C₁₁ is larger than the experimental value, and the rest of the elastic constants are in good agreement with the experimental values, which shows that the MA potential function can effectively predict the elastic properties of rutile TiO₂.

Table 2.

Table 2.

Table 2. Elastic constants, Youngʼs moduli, Poisson ratios, and shear moduli (in unit GPa) of anatase (101) nanotubes with different chiral angles at 300 K, and radius of each nanotube of about 15 nm. . TNTs C11 C12 C13 C33 C44 C66 (0,26) 56.65 19.16 12.96 77.22 12.53 18.54 49.18 72.79 0.31 0.17 18.54 12.53 (8,16) 43.17 15.47 17.13 54.62 16.98 14.33 35.10 44.61 0.27 0.29 14.33 16.98 (10,10) 53.16 18.19 13.81 62.97 13.29 17.14 45.55 57.62 0.30 0.19 17.14 13.29 (10,5) 56.12 19.23 13.08 73.38 12.54 18.35 48.48 68.84 0.30 0.17 18.35 12.54 (9,0) 38.54 12.81 15.60 54.58 15.26 12.42 32.03 45.10 0.25 0.30 12.42 15.26

Table 2. Elastic constants, Youngʼs moduli, Poisson ratios, and shear moduli (in unit GPa) of anatase (101) nanotubes with different chiral angles at 300 K, and radius of each nanotube of about 15 nm. .

Table 3.

Table 3.

Table 3. Elastic constants, Youngʼs moduli, Poisson ratios, and shear moduli (in unit GPa) of anatase (101) nanotubes with different radii at chiral angle 10.47° and temperature 300 K. . TNTs C11 C12 C13 C33 C44 C66 (4,2) R=6.61 52.36 17.80 12.95 58.99 13.88 17.71 44.99 54.21 0.30 0.18 17.71 13.88 (6,3) R=9.92 56.15 19.10 12.19 65.28 12.84 18.63 48.62 61.33 0.31 0.16 18.63 12.84 (8,4) R=13.22 61.11 22.38 15.55 77.90 12.93 18.88 51.60 72.11 0.33 0.19 18.88 12.93 (10,5) R=16.53 56.12 19.23 13.08 73.38 12.54 18.35 48.48 68.84 0.31 0.17 18.35 12.54 (12,6) R=19.83 48.44 16.69 10.26 57.16 10.11 15.78 41.87 53.93 0.32 0.16 15.78 10.11 (14,7) R=23.14 46.52 16.41 10.10 54.81 9.84 15.08 39.92 51.57 0.33 0.16 15.08 9.84 (16, 8) R=26.44 41.54 13.30 9.15 49.06 9.05 13.00 36.46 46.01 0.29 0.17 13.00 9.05 (18,9) R=29.75 37.85 12.14 8.45 47.85 8.80 12.02 33.24 44.99 0.29 0.17 12.02 8.80 (20,10) R=33.05 34.96 11.61 7.96 44.71 8.23 11.61 30.45 41.99 0.30 0.17 11.61 8.23

Table 3. Elastic constants, Youngʼs moduli, Poisson ratios, and shear moduli (in unit GPa) of anatase (101) nanotubes with different radii at chiral angle 10.47° and temperature 300 K. .

Table 4.

Table 4.

Table 4. Calculated and experimental results of elastic constants Cij (in unit GPa) for rutile TiO2 from 300 K to 1000 K. . T/K Method C11 C33 C44 C66 C23 C12 300 This work 312.54 483.29 136.88 210.63 150.63 200.66 Experiment 267.3 483.9 123.9 190.4 146.4 174.1 350 This work 311.81 479.38 135.66 198.36 146.55 196.88 Experiment 265.8 480.7 123.0 187.1 146.2 172.5 400 This work 308.62 476.61 131.99 196.49 146.27 192.17 Experiment 264.0 476.2 122.0 183.9 145.2 170.4 450 This work 310.27 476.11 139.42 196.39 150.94 190.42 Experiment 261.50 471.20 120.90 180.30 143.60 167.70 500 This work 299.00 478.91 139.54 195.52 144.12 185.06 Experiment 260.3 467.2 120.0 177.4 143.4 166.3 600 This work 297.09 473.98 131.70 195.21 141.65 182.76 Experiment 255.4 458.5 118.1 170.9 140.5 161.1 700 This work 310.15 470.99 135.85 190.33 137.93 187.50 Experiment 251.0 450.0 116.2 164.8 137.9 156.5 800 This work 296.06 465.65 132.93 193.37 138.04 183.53 Experiment 247.1 442.1 114.4 159.0 135.9 152.3 900 This work 273.67 462.10 138.02 180.22 136.69 169.18 Experiment 243.2 435.1 112.6 153.5 134.2 148.2 1000 This work 270.88 458.53 128.49 186.62 133.42 164.26 Experiment 238.9 427.0 110.7 148.2 131.8 143.7

Table 4. Calculated and experimental results of elastic constants Cij (in unit GPa) for rutile TiO2 from 300 K to 1000 K. .

However, the experimental values of anatase elastic constants have not been effectively measured. There exists only the bulk modulus for reference.^[38] The elastic constants of anatase at 0 K can be accurately calculated by VASP, and the values are , , , , , (LDA/UPP); , , , , , (GGA/UPP); , , , , , C₆₆=60.^[23,24] The elastic constants calculated by LAMMPS with MA potential function are , , , , , and . And the calculation results of LAMMPS are in good agreement with those of VASP. Many properties of titanium dioxide have been investigated successfully by using the MA potential function.^[39–41] Therefore, the MA potential function can also predict the elastic constants of anatase and nanotubes.

Figure 2(a)–2(e) show that neither of the elastic constants is significantly affected by temperature for each chiral anatase (101) nanotube. Therefore, temperature will not be an impact factor in the change of Youngʼs modulus nor Poisson ratio nor shear modulus. Hence, the following calculation results are all obtained at 300 K.

Fig. 2.

	Figure Option ViewDownloadNew Window
	Fig. 2. Elastic constants C11, C12, C13, C33, C44, and C66 at temperatures ranging from 100 to 500 K with chiral angles of (a) 90°, (b) 36.49°, (c) 10.47°, (d) 20.29°, (e) 0°, respectively.

As can be seen from Table 2, the elastic constants of anatase (101) nanotubes are calculated to be smaller than those of anatase and rutile, and the difference in chiral angle will make the elastic constants of nanotubes different under the condition of the same radius. For the same chiral angle, the elastic constants C₁₁ and C₃₃ are larger than other elastic constants because of the transversely isotropic structures for nanotubes, which have a stronger load capacity on the Z-axis direction than on the other directions. For the different chiral angles that generally range from 0° to 90°, when the chiral angle of TNT is 0°, its elastic constants are basically the minimum, which is the same as Youngʼs modulus and shear modulus. When the chiral angle of titanium dioxide nanotubes is 90°, the elastic constants are the biggest in all elastic constants, which case is the same as those for Youngʼs modulus, shear modulus, and Poisson ratio. The Youngʼs modulus, Poisson ratio, and shear modulus of the nanotubes can be obtained from Eqs. (7) and (8), and Youngʼs modulus is determined by C₁₁, C₁₂, C₁₃, and C₃₃. But C₁₁ and C₃₃ are much larger than other elastic constants, so Youngʼs modulus of the nanotubes is mainly affected by C₁₁ and C₃₃. Poisson ratio is affected not only by the elastic constant but also by Youngʼs modulus. Shear modulus is determined by Youngʼs modulus and Poisson ratio. By comparing the nanotubes (9,3), (9,6) as shown in the Supplementary information (Tables 5, 6 in Appendix A) with those in Table 2, it is found that when the radius of the nanotubes is nearly 15 nm, Youngʼs modulus does not change linearly with the increase of the chiral angle. However, when the chiral angle is 0°, Youngʼs modulus, Poisson ratio, and shear modulus of the nanotubes are lowest. So the nanotubes with a certain chiral angle will improve the mechanical properties of nanotubes.

The elastic constants are also sensitive to the radius of the nanotubes. The relationship between the elastic constants and the radius of nanotubes under the same chiral angle is calculated, where the chiral angles are 7.03° (Table 5), 10.47° (Table 3), 13.85° (Table 6), 36.49° (Table 7) respectively.

Table 5.

Table 5.

Table 5. Elastic constants, Youngʼs moduli, Poisson ratios, and shear moduli (in unit GPa) of anatase (101) nanotubes with different radii at chiral angle 7.03° at 300 K. . TNTs C11 C12 C13 C33 C44 C66 (3,1) R=4.91 47.75 17.51 12.14 56.97 13.35 17.43 40.23 52.45 0.33 0.19 17.43 13.35 (6,2) R=9.82 56.04 18.10 11.46 64.48 12.55 17.87 49.22 60.94 0.30 0.15 17.87 12.55 (9,3) R=14.74 62.08 22.75 14.06 81.26 11.20 18.9 52.73 76.60 0.34 0.17 18.90 11.20 (12,4) R=19.65 49.88 16.96 9.63 58.22 9.41 15.97 43.40 55.44 0.32 0.14 15.97 9.41 (15,6) R=24.56 44.34 15.70 9.45 52.85 9.03 14.74 38.05 49.88 0.33 0.16 14.74 9.03 (18,6) R=29.47 37.84 12.96 8.21 48.44 8.65 12.73 32.78 45.79 0.32 0.16 12.73 8.65

Table 5. Elastic constants, Youngʼs moduli, Poisson ratios, and shear moduli (in unit GPa) of anatase (101) nanotubes with different radii at chiral angle 7.03° at 300 K. .

Table 6.

Table 6.

Table 6. Elastic constants, Youngʼs moduli, Poisson ratios, and shear moduli (in unit GPa) of anatase (101) nanotubes with different radii at chiral angle 13.85° at 300 K. . TNTs C11 C12 C13 C33 C44 C66 (3,2) R=5.02 47.94 17.38 12.64 57.31 13.60 17.17 40.44 52.42 0.32 0.19 17.17 13.60 (6,4) R=10.04 54.39 20.73 13.59 67.00 13.10 20.17 45.38 62.08 0.35 0.18 20.17 13.10 (9,6) R=15.06 55.24 22.27 15.88 78.36 13.76 19.21 45.04 71.85 0.37 0.20 19.21 13.76 (12,8) R=20.08 47.86 16.52 11.20 55.97 11.07 15.54 41.15 52.07 0.31 0.17 15.54 11.07 (15,10) R=25.10 43.64 14.62 10.77 50.82 9.27 13.95 37.68 46.84 0.30 0.18 13.95 9.27 (18,12) R=30.13 38.19 12.71 9.40 48.53 8.93 12.29 33.11 45.06 0.30 0.18 12.29 8.93

Table 6. Elastic constants, Youngʼs moduli, Poisson ratios, and shear moduli (in unit GPa) of anatase (101) nanotubes with different radii at chiral angle 13.85° at 300 K. .

Table 7.

Table 7.

Table 7. Elastic constants, Youngʼs moduli, Poisson ratio, and shear moduli (in unit GPa) of anatase (101) nanotubes with different radii at chiral angle 36.49° at 300 K. . TNTs C11 C12 C13 C33 C44 C66 (4,8) R=8.08 48.86 16.46 18.25 68.25 19.66 16.08 40.93 58.05 0.26 0.28 16.08 19.66 (5,10) R=10.11 49.51 17.05 18.56 66.45 18.49 16.66 41.15 56.10 0.27 0.28 16.66 18.49 (6,12) R=12.13 49.41 17.64 20.01 70.47 19.15 16.57 40.46 58.53 0.27 0.30 16.57 19.15 (7,14) R=14.15 45.75 15.64 16.85 57.45 17.4 15.27 38.00 48.20 0.26 0.27 15.27 17.4 (8,16) R=16.17 43.17 15.47 17.13 54.62 16.98 14.33 35.10 44.61 0.27 0.29 14.33 16.98 (9,18) R=18.19 43.02 14.56 15.21 51.01 15.52 14.29 35.87 42.97 0.26 0.26 14.29 15.52 (10,20) R=20.21 42.61 14.29 14.4 48.67 14.63 14.22 35.73 41.38 0.26 0.25 14.22 14.63

Table 7. Elastic constants, Youngʼs moduli, Poisson ratio, and shear moduli (in unit GPa) of anatase (101) nanotubes with different radii at chiral angle 36.49° at 300 K. .

Table 3 displays that as the radius of each chiral nanotube increases, the elastic constants first increase and then gradually decrease. And C₁₁ and C₃₃ are most obvious because of the transversely isotropic structure. The four kinds of nanotubes with different chirality described above have an optimal radius range from about 10 nm to 15 nm. This means that the anatase (101) nanotubes should have maximum elastic constants in a radius range of about 10 nm–15 nm no matter what kind of chirality they have.

Because Youngʼs modulus is mainly determined by C₁₁ and C₃₃, Youngʼs modulus also presents an increase and then decrease trend as radius increases. From Figs. 3 and 4, it can follow that shear modulus and Youngʼs modulus have maximum values in a range of 10 nm–15 nm. The variation trends of Youngʼs modulus in an isotropic plane and Youngʼs modulus perpendicular to the isotropic plane are basically the same, so are and . However, Poisson ratio fluctuates in a certain range. The calculated elastic modulus values are very similar to Youngʼs modulus values obtained from the direct compressive measurements of individual TiO₂ nanotubes^[42] (23 GPa–44 GPa) and nanoindentation^[43] (36 GPa–43 GPa) in a diameter range of about 35 nm–70 nm. From the analysis above, it can be concluded that in a nanotube radius range of 10 nm–15 nm, Youngʼs modulus and shear modulus will have maximum values. Saeed et al.^[19] successfully improved the mechanical properties of epoxy resin by using nanotubes with a diameter range of 10 nm–20 nm. Because the chiral distribution of nanotubes used experimentally is so wide that it is difficult to determine a single chiral angle of the nanotubes, and thus there will be a lot of nanotubes with different chiral angles in the experiment. However, Figure 3 and 4 show that among all the nanotubes, those in a radius range below 15 nm dominate their optimal mechanical properties. And for chiral nanotubes at 36.49° in a radius range of 8 nm–14 nm, Youngʼs modulus does not differ from each other very much. Therefore, making the diameter of nanotubes as small as possible can improve the mechanical properties of composites.

Fig. 3.

	Figure Option ViewDownloadNew Window
	Fig. 3. Plots of radius-dependent (a) Youngʼs modulus, (b) Poisson ratio, and (c) shear modulus (in unit GPa) of anatase (101) nanotubes with chiral angle 7.03° and different radii. (d) Youngʼs modulus, (e) Poisson ratio, and (f) shear modulus (in unit GPa) of anatase (101) nanotubes with chiral angle 10.47° and different radii.

Fig. 4.

	Figure Option ViewDownloadNew Window
	Fig. 4. Plots of radius-dependent (a) Youngʼs modulus, (b) Poisson ratio, (c) shear modulus (in unit GPa) of anatase (101) nanotubes with chiral angle 13.85°and different radii; (d) Youngʼs modulus, (e) Poisson ratio, and (f) shear modulus (in unit GPa) of anatase (101) nanotubes with chiral angle 36.49° and different radii.

As shown in Fig. 5, phonon densities of states of TNTs with different radii are calculated. Because atoms continuously vibrate at the equilibrium position, there is an interaction between atoms in the crystal, and the vibrations of each atom are not isolated from but interconnected with each other, thus forming elastic waves of various modes. The elastic properties of the crystal can be further analysed from the frequency of crystal vibration. It is worth noting that the nanotubes (4,2), (6,3), (8,4) have additional vibration modes at high frequencies ranging from 25 THz to 28 THz, which means that there is a strong elastic force between atoms. With the increase of radius, the high frequency vibration disappears, which shows that the large nanotubes do not have high frequency vibration and have low elastic forces compared with the small nanotubes. Therefore, elastic properties of nanotubes with small radius are better than those with large radius. This confirms those observations in Figs. 3 and 4. The variation of calculated Youngʼs modulus and shear modulus are small when the radius of nanotubes is small (5 nm–15 nm) due to the high vibration frequency. However, as the radius increases, the elastic constant sharply decreases.

Fig. 5.

	Figure Option ViewDownloadNew Window
	Fig. 5. Plots of phonon density of states (DOS) versus frequency with chiral angle of 10.47° and different radii from (4, 2) to (20, 10).

In this work, the elastic constants, Youngʼs modulus, Poisson ratio, and shear modulus of anatase nanotubes were calculated by using MA potential function and transversely isotropic structure model. The elastic constants of TNTs are found to be not significantly affected by temperature. By calculating the elastic constants of nanotubes with the same radius but different chirality, it can be found that the elastic constants are not proportional to the chiral angle. In addition, both C₁₁ and C₃₃ are larger than the other elastic constants due to the transversely isotropic structure. By calculating the elastic constants of nanotubes with the same chirality but different radii, the elastic constants, Youngʼs modulus and shear modulus first increase and then decrease as radius increases. The maximum values appear in a radius range of 10 nm–15 nm, and Poisson ratio fluctuates in a certain range. Nanotubes with a radius range of 5 nm–15 nm have high frequency vibration and large elastic constants compared with big nanotubes. Therefore, the radius of the nanotubes should be as small as possible to enhance their mechanical properties in practice.