3.1. Graph-theoretic approach

This study utilizes a mathematical framework based on the graph-theoretic approach to model and analyze the level of alignment. The integration dimensions are represented as a graph, where nodes correspond to key components or factors, and edges capture relationships or interactions among them. The proposed approach, based on (Reference Belhadi, Kamble, Jabbour, Mani, Khan and TourikiBelhadi et al., 2022), can quantify the alignment level, identify interdependencies and evaluate performance under various scenarios.

3.1.1. Graph representation

A system is represented as a directed or undirected graph G = (V,E), where V = {v ₁,v ₂, …v_n } is the set of nodes representing dimensions, factors, or entities in the system. is the set of edges representing dependencies or interactions between nodes.

The system graph is encoded into a variable permanent matrix (VPM), A, defined as i) diagonal elements (a_ii ) represent the importance or weight of each node v_i , and ii) off-diagonal elements (a_ii ) represent the interaction or dependency between nodes v_i and v_j . For example, the matrix A for a graph with 3 nodes is defined as follows:

(1) $$A = \left[\matrix{{a_{11} } \hfill & {a_{12} } \hfill & {a_{13} } \hfill \cr {a_{21} } \hfill & {a_{22} } \hfill & {a_{23} } \hfill \cr {a_{31} } \hfill & {a_{32} } \hfill & {a_{33} } \hfill } \right] $$

3.1.2. Performance index calculation

The performance of the integration is quantified using the permanent of the VPM (Reference Kumar, Singh and KumarKumar, Singh, & Kumar, 2017):

(2) $$perm(A) = \mathop \sum \limits_{\sigma = S_n } \mathop \prod \limits_{i = i}^n a_{i,\sigma (i)} $$

Where, S_n is the set of all permutations of {1,2, …, n}, and a _i,σ(i) is the element of A at row i and column σ(i). The summation iterates over all n! permutations σ, and for each permutation, $\mathop \prod \nolimits_{i = i}^n a_{i,\sigma (i)} $ multiplies one element from each row and each column according to σ.

We use a hierarchical matrix to assess the level of alignment of R-imperatives with the integrated PD and SC design decisions. Each node in the primary matrix shows one R-imperative in the proposed hierarchical matrix. For each R-imperative, there is another matrix, in which its nodes represent the integrated PD and SC design decisions. Figure 1 shows the structure of the proposed hierarchical matrix.

Figure 1. The proposed hierarchical structure

The equation Eq. (2) can be expanded into equation Eq. (3).

(3)

3.2. Enhancing the calculation efficiency

Calculating the permanent of a matrix is a computationally intensive problem as it requires evaluating all permutations of row-column combinations. This makes the direct computation of the permanent infeasible for larger matrices due to its factorial growth in complexity (O(n!)). To address these challenges, an exact calculation method called Glynn’s formula can be applied to small-to-moderate-sized problems. Unlike the naive summation over n! permutations, Glynn’s formula reformulates the permanent as:

(4) $$perm(A) = 2^{n - 1} \mathop \sum \limits_{\sigma \in \{ - 1,1\} ^n } \mathop \prod \limits_{i = 1}^n \left({{{1 + \sigma _i }}\over {2}}\mathop \sum \limits_{j = 1}^n \sigma _j a_{ij} \right)$$

This approach reduces the computational time by leveraging algebraic transformations to sum over 2 ⁿ terms instead of n!. Glynn’s formula exploits symmetries and linearity in matrix operations, making it particularly effective for matrices that are not excessively large.

3.3. Scenario-based analysis

Three scenarios are considered to evaluate integration performance under varying conditions and showing the level of alignment in different situations. First, the worst-case scenario represents the least favorable conditions, where node contributions and interaction strengths are minimized based on expert judgment or historical data. Examples include low modularity in product design or poor coordination between stakeholders. In the second scenario, the best case represents the optimal conditions where node contributions and interaction strengths are maximized. Finally, the normal case scenario represents typical or average conditions. For each scenario, the VPM is adjusted to reflect the specific conditions, and PI (matrix permanent) is computed as follows:

(5) Alignment Index_{scenario} = perm(A_{scenario} )

To compare the performance across scenarios, a performance index (PI), developed based on (Reference Belhadi, Kamble, Jabbour, Mani, Khan and TourikiBelhadi et al., 2022), is calculated as follows:

(6) $$PI = {{{Alignment Index_{Normal} - AlignmentIndex_{worst} }}\over {{AlignmentIndex_{best} - AlignmentIndex_{worst} }}}$$

4.1. Framework development

As explained in Section 1, the R-imperatives are interconnected strategies that form the foundation of CE. Each imperative influences and supports others (see Figure 2). For instance, Reuse increases the likelihood of wear, necessitating Repair. Repair feeds into Refurbish by restoring components that may undergo further aesthetic or functional upgrades. If Refurbishment is insufficient, for example, products can transition to Remanufacture, where they are disassembled and rebuilt. This network of interdependencies emphasizes the systemic nature of the R-imperatives and explains the interconnections between R-imperatives, PD and SC design decisions.

Figure 2. The structure of the digraph of R-imperatives dimensions

The next step is considering the interconnections between the dimensions. Table 1 shows the set of decisions the company made to integrate PD and SC design decisions and their interconnection with each R-imperative.

Table 1. Dimensions of PD and SC decision integration for each R-imperatives

Using the proposed graph-theoretic approach, the interconnections between R-imperatives, PD, and SC design decisions can be modelled with the R-imperatives as nodes and the interconnections as edges (see Figure 3). This framework analyzes how R-imperatives influence one another and are interrelated to product characteristics and SC design decisions.

Figure 3. The structure of the digraph of PD and SC decision integration for each R imperatives

4.2. Data collection

The data for this study are collected through insights from interviews and factory visits conducted from a lighting-systems manufacturer, which is part of the Circular Manufacturing project in Norway. The first author designed two matrices to ensure it accurately reflected the company’s integration of circular strategies. 1) the main matrix, structured according to Figure 2, is mapping interconnections between different R-imperatives, and 2) sub-matrices, structured based on Figure 3, are detailing the interdependencies between integrated PD and SC design decisions. Since direct (quantitative) data from the company was unavailable, insights from the interviews were used to populate the data. This expert-driven approach ensured that the collected data captured real-world industry insights, while maintaining consistency and accuracy in the analysis. Due to space limitations, only a portion of the data is presented below. This data corresponds to normal scenarios. The matrix values range from 0 to 1, with 1 indicating the highest level of importance. For example, A→A = 1 means that implementing integrated decision A is very important for the manager. Repair↔Repurpose=0.2 means that by implementing the design for repairing, we can satisfy around 20% of the requirements for design for repurposing.

Figure 4. Interconnections between R-imperatives and (a-f) interconnections between integrated PD and SC design decisions

4.3. Numerical results

The numerical results presented in this section demonstrate the application of the proposed graph-theoretic approach to assessing the level of alignment of each R-imperatives with integrated PD and SC design decisions. The results analyze the alignment level by three distinct scenarios—‘worst,’ ‘normal’, and ‘best’ case—and compute PI to assess the relative effectiveness of integration strategies. Each scenario shows the expectation of aligning each R-imperative with each PD and SC design decision. For example, the normal scenario describes a situation with no unexpected disruption or uncertainty in SC. However, the worst scenario explains a situation where there may be unforeseen disruptions such as material shortage, pandemics, etc., affecting the SC negatively.

After solving the model, the numerical results in Table 2, show the PI for each sub-matrix corresponding to the dimensions of the hierarchical model. This enables a granular evaluation of the contributions of individual dimensions under the worst-case, normal, and best-case scenarios.

Table 2. Calculated the alignment index and PI for each R-imperatives

As presented in Table 2, the alignment index and PI values indicate the relative effectiveness of different R-imperatives in CE implementation. Among the imperatives, Repair (0.344905) exhibits the highest PI, closely followed by Refurbish (0.324666), Recycling (0.323632), and Remanufacture (0.322093). These values suggest that these strategies are more aligned with the integrated decisions and sustainable practices under varying conditions.

The Best-Case Index values indicate the maximum potential impact of each strategy under ideal conditions. Remanufacture (23.817225) and Reuse (20.664987) exhibit the highest values, highlighting their significant contributions when conditions are favourable. Repair and Recycling, with Best Case Index values of 4.018384 and 3.89467, respectively, also demonstrate notable effectiveness. In contrast, Repurpose (2.705984) has the lowest Best Case Index and PI (0.297165), indicating that it may be less viable compared to other strategies. The total sum of indices across different scenarios shows a clear trend of increasing effectiveness, moving from 5.785363 in the worst case to 58.42775 in the best case. This highlights the significant improvements achievable by providing ideal conditions for implementing R-imperatives. These findings offer insights for prioritizing R-imperatives based on their performance potential and help decision-makers develop more effective and adaptable sustainability frameworks.

The results illustrated in Figure 5 highlight essential managerial implications for effectively implementing R-imperatives within SC and product lifecycle management. The findings suggest that Repair is the most impactful strategy, achieving the highest performance index (PI = 0.344905). This implies that this R-imperative is a consistently effective strategy across all scenarios. Its relatively strong performance suggests that businesses should prioritize repair-friendly designs, spare part availability, and service infrastructure to extend product lifespans and reduce waste.

Figure 5. The level of alignment with R-imperatives in each scenario (right) and PI index (left)

Remanufacturing (PI = 0.322093) and Refurbishing (PI = 0.324666) offer moderate performance, with remanufacturing showing significant potential under ideal conditions (Best Case Index = 23.817225). This suggests that while remanufacturing can be highly effective, it requires a well-structured SC and favorable operational conditions. Companies should invest in efficient reverse logistics and automation to enhance remanufacturing viability. Recycling (PI = 0.323632) also exhibits stable performance, making it a reliable fallback option, but its resource-intensive nature suggests it should be considered only after higher-value recovery strategies.

Reuse and Repurpose have the lowest PI values (0.296508 and 0.297165, respectively), indicating that their effectiveness is more limited. While reuse shows strong potential in best-case conditions (20.664987), its lower worst-case performance suggests challenges such as product availability and consumer acceptance. Similarly, repurposing has the lowest best-case index (2.705984), making it the least viable option for large-scale CE applications unless specific market demand exists.

These findings emphasize the need for a multi-strategy approach to ensure the effective implementation of CE initiatives. Businesses should prioritize repair and remanufacturing, integrate refurbishing and recycling where feasible, and evaluate the practicality of reuse and repurposing based on product characteristics and market demand. A well-structured framework that aligns PD and SC decisions is essential to maximize the benefits of circularity.

The total sum of indices highlights the transformative impact of R-imperatives when correctly managed, with the best-case scenario reaching 58.42 compared to 5.79 in the worst case. This significant variation suggests that well-structured CE initiatives can vastly improve resource utilization. To leverage these benefits, businesses should adopt an integrated CE model that dynamically transitions products through different recovery strategies based on their condition and market viability. A tiered approach, prioritizing reuse and repair first, followed by refurbishing and remanufacturing, and considering recycling as the final option, can maximize resource efficiency while minimizing waste.

For successful implementation, managers must adopt a systemic approach integrating SC processes, consumer engagement, and regulatory compliance with CE objectives. Regulatory frameworks, tax incentives, and extended producer responsibility policies can further support these efforts, encouraging companies to take full ownership of product lifecycles. Collaborating with third-party refurbishers, remanufacturers, and recycling facilities can enhance reverse logistics efficiency while reducing operational costs. Effective CE implementation requires a strategic balance among reuse, repair, refurbishing, remanufacturing, and recycling. Companies that proactively design products for longevity, develop robust reverse logistics networks, and leverage technological advancements will gain a competitive advantage in both sustainability and cost reduction. By transitioning toward a holistic circular SC model, businesses can strengthen their resilience, reduce environmental impact, and create long-term economic value.