2.1. Topology optimization

The method for topology optimization is based on the procedure of Zuo & Xie (Reference Zuo and Xie2015), which is available as a simple Python code for the optimization of three-dimensional parts. The method uses a BESO algorithm, where the goal is to minimize the objective function C, also known as compliance. The sensitivity α_e is used for the optimization, which is determined by differentiating the objective function C in Equation 1.

(1) $$\matrix{{\mathop {\min }\limits_x :C({\bf{X}}) = {\bf{F}}^T {\bf{U}} = {\bf{U}}^T {\bf{KU}}} \cr {\alpha _e = {{\partial C} \over {\partial x_e }}} \cr } $$

Where F is the force vector, U is the displacement vector, and K is the stiffness matrix. x_e is the design variable of the element e. A detailed explanation of the calculation of the objective function as well as for the filtering and averaging of the sensitivity, can be found in Huang & Xie (Reference Huang and Xie2007) and Zuo & Xie (Reference Zuo and Xie2015).

The procedure of the topology optimization algorithm used here is shown in Figure 2. The model initialization includes the placement of the part and the definition of boundary conditions and forces. The volume target and the evolutionary ratio ert, which specifies the change per iteration step, are also defined. After initializing the model, a static-mechanical FEM simulation is carried out. The sensitivities of the individual elements are then calculated, filtered, and averaged from the results. A threshold is determined that decides whether an element is assigned to the solid set (x_e = 1) or the void set (x_e = 0.001). In each iteration, the part volume is reduced by the evolutionary rate ert. Once the elements have been adjusted, the model is updated and then checked to ensure that convergence and the defined volume target v_Fr have been achieved. The volume target v_Fr is defined as the fraction of the volume of the optimized part to the initial part volume. If this is the case, the optimization is terminated, otherwise a further iteration step is carried out.

Figure 2. Method for topology optimization according to Zuo & Xie (Reference Zuo and Xie2015)

2.2. Integrating optimized cavity position and geometry

In order to integrate the particle damping in an iterative optimization process, an objective function must be defined that ensures that the part damping is maximized. According to Oel et al. (Reference Oel, Kleyman, Jonkeren, Tatzko and Ehlers2024), an increase in the displacement and volume of the cavities leads to an increase in the damping D. Therefore, the objective function Z_PD is defined in Equation 2.

(2) $$\matrix{{\max D(Y) \sim \max \mathop \sum \limits_{e = 1}^N (y_e v_e q_e ) = \max Z_{PD} (Y)} & {Y = \{ y_e \} } & {\forall e = 1, \ldots ,N} \cr } $$

Here, q_e indicates the normalized displacement amplitude and v_e the volume of an element e. y_e defines the affiliation of an element e, where y_e = 1 for a particle damper (PD) element and y_e = 0 for solid or void elements. The sensitivity β_e is defined on the basis of the objective function (see Equation 3).

(3) $$\beta _e = q_e $$

The complete procedure for the integration of internal closed cavities for particle damping is shown in Figure 3. In addition to the model initialization and the static-mechanical FEM as explained in section 2.1, a FE modal analysis is carried out using Abaqus to read out the displacement of the individual elements. The sensitivities α_e and β_e are then calculated, filtered, and averaged from the element-byelement results. In addition to comparing the sensitivity β_e with the threshold value, it is checked whether the sensitivity α_e of an element is lower than the threshold value α_th . This is to prevent highly loaded elements from being assigned to the PD set and converted into a cavity. The mechanical properties of the PD elements are identical to those of the void elements, but the mass of the particles is taken into account when calculating the weight reduction. If the potential to generate a PD element is given, it must be checked whether the resulting change to the part complies with the restrictions. In this context, it is checked whether the inner cavities are closed and whether the minimum wall thickness wt is maintained. These restrictions, which are shown in Figure 4 (a), are checked by querying neighboring elements and elements within a certain radius. If possible, other elements are adjusted to comply with the restrictions, as shown in Figure 4 (b) as an example. To increase the optimization speed, an assignment of neighboring elements is carried out during model initialization so that the neighboring elements only need to be checked and not searched for when inspecting the wall thickness.

Figure 3. Method for integrating internal cavities for particle damping

Figure 4. Visualization of the restrictions. (a) Integrating the cavities, (b) adaptation to neighboring elements

Once the element assignment has been adjusted, the model is updated and the convergence as well as whether the volume target v_PD,Fr has been reached is checked in the same way as for topology optimization. The volume target of the particle damping integration v_PD,Fr specifies the fraction of the volume of the cavities to the volume of the optimized part. If necessary, a new iteration is started, otherwise the optimization is terminated.

2.3. Optimization tool for mass, stiffness, and damping

In order to combine the two objectives of weight reduction and integration of cavities for particle damping, the two optimization algorithms presented above are combined in one tool. The entire optimization process consists of individual iterations that either change the topology for weight reduction or generate the internal cavities.

The decision as to which of the two optimization processes is carried out is based on the distance dV_TOP and dV_PD to the volume targets v_Fr respectively v_PD,Fr . The distances to the volume targets dV_TOP and dV_PD are calculated as follows:

(4) $$dV_{TOP} = {{v_{Fr}^{k - 1} - v_{Fr} } \over {1 - v_{Fr} }}\quad \quad \quad dV_{PD} = {{v_{PD,Fr} - v_{PD,Fr}^{k - 1} } \over {v_{PD,Fr} }}$$

Where v ^k−1 describes the volume fraction of the total volume of the previous iteration and $v_{pd}^{k - 1} $ is the volume fraction of the cavity in the target volume of the previous iteration. As there is a significant change in the topology, particularly in the first iterations, the modal system also changes significantly. To prevent cavities from being created in vibration maxima of the initial topology, which would prevent effective optimization of the part in the further course, topology-only optimizations are carried out at the beginning. Once these start iterations n_Start have been completed, the modes to be used for the integration of the cavities can be selected. The procedure of the entire optimization tool is shown in Figure 5. The model initialization, FEM analysis and determination, filtering, and averaging of the sensitivities is carried out in the same way as in the previous procedure. The distances to the respective defined overall targets are then calculated. Together with checking whether the initial topology-only optimization iterations n_start have already been completed, a decision is made regarding which of the two optimization algorithms will be applied in this iteration. If the topology is to be optimized, the procedure from section 2.1 is followed. In addition, compliance with the defined restrictions is checked. For the integration of particle damping, the procedure from section 2.2 is performed. After updating the model, the accomplishment of convergence and volume targets is checked. If necessary, a further iteration step is started, otherwise the optimization is completed.

Figure 5. Method for iterative optimization of part topology and integration of internal cavities for particle damping