FFT-Based Numerical Method for Nonlinear Elastic Contact

According to the Hertz theory, when a load F = 4p₀ER² = p₀EA₀ is applied between a ball of radius R and a rigid plane, the equivalent elastic modulus E^*, maximum deformation of the ball ω, contact area A, and maximum contact pressure P_max can be expressed as shown in Eq. (10) [29]:

Figure 6(a) shows the results of elastic contact between the hemisphere (E = 210 GPa; Poisson’s ratio ν = 0.3) and the rigid plane calculated using the Hertz theory and the FEM (using ABAQUS software), where P_max/E--FEM, P_max/E--Hertz, CA--FEM, and CA--Hertz represent P_max/E and CA calculated using FEM and Hertz theory, respectively; error--P_max and error--CA are relative error of two methods. As shown, as the load increased, the dimensionless contact area CA = A/A₀, and the maximum contact pressure P_max increased gradually. When the load was small, the result calculated using the Hertz theory was similar to that obtained using the FEM, thereby verifying the accuracy of the FEM calculation within the range of small loads. Moreover, the relative error between the two methods increased gradually as the load increased. The contact area calculated using the Hertz theory was larger than that obtained using the FEM, whereas the maximum contact pressure result was the opposite. Based on the derivation process of the Hertz theory, it was discovered that the calculated contact area was larger than the actual value, whereas the maximum contact pressure was smaller than actual value, which is consistent with the results above. In addition, the Hertz theory is only suitable for small loads and deformations. When the deformation is large, the calculation error becomes extremely large and hence the Hertz theory cannot be applied. For example, when the dimensionless load p₀ = F/A₀E = 0.0003, the maximum deformation of the ball is ω≈0.0042 mm = 0.0084R, the radius of contact area is approximately 0.0465 mm = 0.093R, and ω²/a² ≈ 0.008 ≪ 1; therefore, the calculation error is negligible, and the Hertz theory is applicable. When p₀ = 0.1, ω ≈ 0.16 mm = 0.32R, a ≈ 0.3 mm = 0.6R, and ω²/a² ≈ 0.28, the calculation error is not negligible. To further verify the accuracy of the FEM under a large load (p₀ = 0.1), the mesh was refined from the original 17908 elements to 60282. It was discovered that the maximum contact pressure increased from 0.5298E to 0.5319E, and the contact area increased from 0.2884A₀ to 0.2896A₀, and the relative errors for both were less than 0.5%. Therefore, the calculated values using the FEM were regarded as accurate for the entire load range.

Because Stanley’s method [18] is applicable to complete contact, w must be modified to w' = k × w, based on the FEM results. The modified results are presented in Figure 6(b), where k is correction coefficient; error--P_max and error--CA are relative errors of numerical method and FEM, respectively. As shown, the value of k remained stable over the entire load range of approximately 0.135. Furthermore, elastic contact with an elastic modulus of 0.5E and 2E was obtained using the FEM. The results show that, regardless of the elastic modulus, the calculation results under the same p₀ were the same, indicating that the coefficient k is applicable to the linear elastic contact calculation of materials with different elastic moduli. The CA and P_max were calculated using the numerical method, and their relative errors compared with the FEM results under different loads p₀ were calculated as well, as shown in Figure 6(b). In the entire load range, the relative error of P_max increased with the load, and all error values were less than 10%. The relative error of the CA first decreased and then increased as the load increased. For the numerical simulation, the CA is the ratio of the number of elements in the contact area (approximately circular) to the total number of elements. Compared with a large load, when the load is smaller, the same error for the number of elements in the contact area will result in a larger relative error for the CA. In addition, the total number of elements (64 × 64 in this section) and the presence of a planar area around the hemisphere (as shown in the inset of Figure 6(b)) will affect the relative error of the CA.

In this study, the numerical method was used to calculate the elastoplastic contact between a hemisphere and a rigid plane. The results were compared with the linear elastic and elastoplastic results calculated using the FEM, as shown in Figure 7. In Figure 7, P_max,E,FEM, P_max,EP,FEM, and P_max,EP,S represent P_max/E of elastic contact by FEM, elastoplastic contact by FEM, and elastoplastic contact by numerical method. Representation for CA is denoted similarly. P_max,S,FEM, CA_S,FEM are relative error of elastoplastic contact for numerical method and FEM, respectively. The uniaxial compressive stress–strain curve of the material exhibits linear hardening, an elastic modulus E = 210 GPa, E′ = 0.5E = 105 GPa, and an initial yield stress σ_n = 235 MPa = 0.0011E. The yield stress σ_Y and plastic strain ε^p of the material can be expressed using Eq. (11) [21], and the material properties for the FEM can be defined accordingly. Based on the CEB model [29], an initial yield occurs when p > KH = K∙a∙σ_n = 0.6 × 2.8 × 235 MPa = 394.8 MPa = 0.0019E. Therefore, Eq. (12) was used to define the critical pressure p_n in the numerical method. If the von Mises stress is greater than the yield stress σ_n in the FEM, or the maximum contact pressure P_max is greater than the critical yield pressure p_n in the numerical method, then the material will yield:

As shown in Figure 7, if plastic deformation is considered, then P_max decreases, and CA increases under the same load. Compared with the linear elastic contact results, the elastoplastic contact results of P_max and CA calculated using the numerical method were similar to those of the FEM results. Yielding occurred over the entire load range, and the plastic deformation area increased with the load. The error of the elastoplastic contact caused by the numerical method was due to the calculation of the linear elastic contact and the solution for the residual deformation. When the load p₀ ranged between 0.0003 and 0.1, the relative error of the contact area was small, and the relative error of the maximum contact pressure was less than 15%.

In the numerical calculation for the elastoplastic contact, the total number of elements was 64 × 64 = 4096, and the specification error er (as shown in Figure 3) was 0.03. To understand the effects of the number of grids and the value of er on the calculation results, the calculation time and calculation error of P_max for different er values (0.01, 0.03, 0.05, 0.1) and different grid numbers (16 × 16, 32 × 32, 64 × 64, 128 × 128) were analyzed, as presented in Figure 8. As shown in Figure 8(a), within the load range, the calculation time was 1–9 min, and the calculation error ranged between 9.5% and 14.5%, and both decreased as the load increased. At the same grid number and same load, the calculation time decreased slightly, whereas the calculation error increased slightly as er increased. In terms of the effect of the grid number, as shown in Figure 8(b), at the same er and the same load, the calculation time increased with the grid number, and the time span was large. The calculation time did not exceed 1 min when the grid number was 16 × 16. When the grid number was 32 × 32, the calculation time was 0–2.5 min. When the grid number was 64 × 64, the calculation time was 2–8 min. When the grid number was 128 × 128, the calculation time was 8–47 min. However, except for the larger calculation error with a grid number of 16 × 16, the calculation errors corresponding to the other three sets of grid numbers were similar. Therefore, considering the calculation time and calculation error, a grid number of 32 × 32 or 64 × 64 appeared to be a better option.

The contact behavior between the hyperelastic hemisphere and the rigid plane was calculated. In the FEM, the constitutive model of rubber must be defined based on the compressive stress–strain curve of the material, as presented in Figure 9(a). As shown, among the five fitted constitutive models, the Ogden³ model yielded the best fitting result; therefore, it was selected to define the material properties in the FEM. For numerical simulation, the original stress–strain curve must be simplified to a combination comprising two linear segments. As shown in Figure 9(b), three simplified results were obtained: FC1, FC2, and FC3. The parameters of each fitted curve are shown in Table. As shown, four values were obtained for elastic moduli E and E′, whereas three values were obtained for the critical stress.

The hyperelastic contact calculation under different loads (0.001–50 N) was performed using the FEM. As shown in Figure 9(b), two elastic moduli, E₁ = 3.1251 MPa and E₂ = 32.4054 MPa, were selected as the elastic modulus of the linear elastic contact to approximate the hyperelastic contact (ν = 0.49), as presented in Figure 10. In Figure 10, Elastic E₁ and Elastic E₂ represent linear elastic contact results using FEM with elastic modulus E₁ and E₂, respectively. HE-FEM represents results of hyperelastic contact calculation using FEM. As shown, the approximation results can be artificially segmented into three regions. When the load was small, the linear elastic contact result with a lower elastic modulus E₁ was similar to the hyperelastic contact result (area A). When the load was large, the linear elastic contact calculation with a higher elastic modulus E₂ yielded a better approximation result (area C). Between the two regions (area B), the approximation errors of the linear elastic contact with both elastic moduli were relatively large. For the approximation via linear elastic contact calculation, the selection of the elastic modulus E and the approximation result are associated with the load and material properties, which are yet to be elucidated currently, particularly for complicated rough surfaces. Therefore, the numerical method used in this study was utilized to approximate the hyperelastic contact.

In reference to Figure 10, load values of 0.01, 1, and 5 N were selected for areas A, B, and C, respectively. For the three fitted curves FC1, FC2, and FC3, nonlinear elastic contact calculation was performed using the numerical method under the selected three loads (the critical pressure p_n is calculated using Eq. (12)). The results of the pressure distribution along the radius of the contact area are shown in Figure 11. In Figure 11, “Hyperelastic--FEM” represents result of hyperelastic contact calculation in FEM. “FC1,” “FC2,” “FC3” represent results of non-linear elastic contact calculation with fitted curves FC1, FC2, and FC3 using numerical method, respectively. “Elastic-E1-FEM” and “Elastic-E2-FEM” represent results of elastic contact calculation with elastic moduli E₁ and E₂ using FEM, respectively. When the load was 0.01 N (Figure 11(a)), the maximum contact pressures of the three fitted curves calculated using the numerical method were smaller than the corresponding critical pressures; therefore, they were in the state of linear elastic contact. Curve 2 corresponds to a linear elastic contact approximation with an elastic modulus of 0.6027 MPa, whereas curves 3, 4, and 5 were equivalent to a linear elastic contact approximation with an elastic modulus of 3.1251 MPa; curve 6 corresponds to a linear elastic contact approximation with an elastic modulus of 32.4054 MPa. It was observed that under a small load, linear elastic contact with a lower elastic modulus E₁ and nonlinear elastic contact of the three fitted curves yielded good approximation results. When the load was 1 N (Figure 11(b)) or 5 N (Figure 11(c)), the three fitted curves were in the state of nonlinear elastic contact. When the load was 1 N, compared with the large approximation error of linear elastic contact with either a lower elastic modulus E₁ or a higher elastic modulus E₂, the three nonlinear elastic contact calculations yielded better approximation results. When the load was 5 N (5 N was extremely large for linear elastic contact with elastic modulus E₁ to converge in the FEM; therefore, it was not considered), the two nonlinear elastic contacts of fitted curves FC2 and FC3 fitted better. In conclusion, compared with the approximation by linear elastic contact with a specific elastic modulus, the nonlinear elastic contact approximation offers calculation results of hyperelastic contact that can be better fitted within the load range in this study. Considering the calculation efficiency and approximation results, FC3 was the best among the three fitted curves. The calculation error of this numerical method originated primarily from the fitting results of the stress–strain curve, linear elastic contact calculation, and the solution of the equivalent residual deformation. In theory, to better fit the calculation results of hyperelastic contact, the original stress–strain curve can be simplified to a combination of multiple linear segments with a shape that resembles the original curve.

For the contact between the machined rough surface and the rigid plane (Figure 12(a)), the typical form of the cross section of the leak path formed at the interface contact was discovered to be a triangle with α≈4° [30]. As shown in Figure 12(b), the height of the initial undeformed cross section of the leak path was h₀. Under an applied load F = p₀E₀ × l₀, the contact area between the rough surface and the rigid plane was A_c. The cross section of the leak path was reduced proportionally, and the deformed height was reduced to h. Therefore, the relationship between h and A_c can be expressed as shown in Eq. (13), where CA denotes the dimensionless contact area. And the topography and pressure distribution of deformed surface can be obtained by contact calculations, shown in Figure 11 and Figure 13. Using the laminar flow of an incompressible fluid as an example, the viscosity of the fluid is η. When the fluid pressure difference across the leak path is Δp, the leak rate of a single deformed leak path can be calculated using Eq. (15) [31], where q_V is the volume flow rate:

As shown in Eqs. (9) and (10), to obtain the volume flow rate, the contact area A_c or dimensionless contact area CA must be solved based on the applied load. Therefore, the numerical method was used to calculate the linear elastic, elastoplastic, and hyperelastic contact between the machined rough surface (the relevant parameters are shown in Table 3) and the rigid plane. In this example, the height of the initial undeformed cross section of leak path h₀ was 2 μm, the total number of elements was 64 × 64 = 4096, and the specification error er was 0.03. The calculation results are presented in Figure 14. As shown, as the load increased, the contact area increased gradually. For the elastoplastic contact, under the same load, the contact area was larger than that of the elastic contact and increased as E′ decreased. For the hyperelastic contact, compared with the elastic contact, the contact area reduced and increased as E' decreased.

As presented in Eq. (15), q_V is proportional to h⁴ when Δp, l₀, and η remain constant; therefore, h⁴ was calculated to compare the relative value of the leakage rate, as shown in Figure 15. Contrary to the calculation result of the contact area, q_V reduced, and the difference in q_V for different materials increased with the load. For the elastoplastic contact, under the same load, the flow rate was less than that of the elastic contact and decreased with E'. For the hyperelastic contact, compared with the elastic contact, the flow rate increased and then decreased as E' decreased.

For an isotropic complicated rough surface, if the surface topography is known, then the leakage channel can be determined using the lattice leakage model [32], and the leakage rate can be calculated using Eq. (14). The topography of the undeformed rough surface is shown in Figure 16, where the length and width of the rough surface are Δx and Δy, respectively. The undeformed profile is expressed as shown in Eq. (16), and the units of z was micrometers.

The contact area and leakage rate were calculated, and the results are shown in Figures 17, 18, respectively. In this example, the total number of elements was 64 × 64 = 4096, and the specification error er was 0.03. Similar to the calculation results presented in Section 3.2.1, for the same material, the contact area increased, and the leakage rate decreased as the load increased. The effects of different materials on the calculation results was the same as that presented in Section 3.2.1. However, for the elastoplastic contact in this example, when the contact area exceeded a certain value, no through leakage channel was present; therefore, the leakage rate decreased to 0.

Consider the calculation results of elastoplastic contact with E′ = 0.5E as an example, as shown in Figure 19. In the plan view of the leak channel (Figure 19(b1)–(b3)), blue indicates the contact field, green the through leak channel, and white the leak channel with no fluid passing through. When the applied load p₀ was in the range of 0.5–2, the dimensionless contact area was less than 0.35, and a through leakage channel was present. When p₀ exceeded 3, the contact area was extremely large, which hindered the formation of a through leakage channel; therefore, the leakage rate was 0.