Selection of Suitable Cloud Vendors for Health Centre: A Personalized Decision Framework with Fermatean Fuzzy Set, LOPCOW, and CoCoSo

2.1Selection of Cloud Vendor Services

Ranking cloud service providers is essential for optimizing resource utilization and improving the user experience. It enables informed decision-making and addresses the challenges of the rapidly changing cloud environment. Garg et al. (2013) proposed the first decision framework for ranking cloud services using the AHP (“analytical hierarchical process”) based ranking mechanism to compare different cloud services. Since then, several studies have proposed fuzzy logic-based techniques to enhance cloud computing services. These techniques include an intelligent intermediary that assists inexperienced users in specifying their requirements, a self-learning approach for efficiently allocating resources in online games, and an algorithm for minimizing costs and time in IaaS clouds.

Additionally, a hybrid system is developed for analysing nuanced sentiments in tweets about cloud services. Another method considers QoS attributes and user feedback to rank cloud providers. A fuzzy logic model is suggested for selecting cloud providers, while another measures the uncertainty in survey responses. Finally, a trust model is introduced to aid users in identifying reliable cloud service providers (Mateen et al., 2020; Alharbi and Alhalabi, 2020; Gireesha et al., 2020; Khorsand et al., 2019; Nagarajan and Thirunavukarasu, 2019; Rizvi et al., 2020; Zhou et al., 2019). A comprehensive summary of literature focusing on CV selection using MCDM and fuzzy methodologies is provided in Table 1.

Table 1 provides an overview of various MCDM and fuzzy methodologies for CV selection. From Table 1, the following inferences can be drawn. (i) The existing approaches to CV selection may not robustly handle uncertainty through linguistic and hesitant fuzzy set variations in criteria weights, expert opinions, or alternatives, potentially resulting in unreliable or inconsistent results. (ii) The existing approaches to CV selection may not effectively capture the hesitation or uncertainty of experts where human-centric hesitation and varying degrees of confidence are not adequately accounted for in these approaches. (iii) The existing approaches to CV selection struggle to capture extreme value hesitancy in criteria, where experts have difficulty assigning precise importance to the criteria for ranking the CVs. (iv) The existing approaches to CV selection may need to pay more attention to the need for a compromise solution that balances conflicting criteria or objectives in an uncertain, potentially leading to suboptimal or biased CV selections. Motivated by these inferences, the authors formulated an MCDP (“multi-criteria decision problem”) for CV selection in an uncertain condition having a precise depiction of data, a human-centric approach for capturing experts’ importance, methodology to capture extreme values for criteria importance, a compromised methodology for ranking the CVs.

2.2Fermatean Fuzzy Sets

In recent years, fuzzy logic has been successfully used to resolve the challenges of estimating decision-making under uncertain conditions. Atanassov (1986) proposed IFS, which can solve many MCDM problems in uncertain environments. IFS does not cover more data points (u,v), where u is the degree value of preference and v is the degree value of non-preference, such that u+v⩽1. As an extension of IFS, Yager (2016) introduced PFS that can accommodate more points (u,v) compared to IFS, such that u2+v2⩽1 in uncertain environments. Further, Senapati and Yager (2020) introduced FFS as an extension of IFS and PFS, focusing on their properties and applications in MCDM problems. FFS supports a more fine-grained representation of uncertainty and more flexible modelling of complex decision-making scenarios since it can cover more data points (u,v), such that u3+v3⩽1. Senapati and Yager (2020) stated that for an MCDM problem under the FF (“Fermatean fuzzy”) domain, there are multiple alternatives and criteria with certain weights. The assessment values for each alternative with respect to each criterion are represented as FFN (“Fermatean fuzzy number”). These FFNs form a Fermatean fuzzy decision matrix. Senapati and Yager (2020) also suggested that MCDM issues with FFNs can be approached similarly as other fuzzy frameworks. To show the compatibility of FFS in MCDM, Senapati and Yager (2020) applied the TOPSIS (“technique for order preference by similarity to ideal solution”) ranking algorithm on the FF decision matrix, and this proved to be effective in interpreting MCDM problems with FFD (“Fermatean fuzzy data”).

Since its introduction, many researchers have utilized FFS and its extensions. For instance, Garg et al. (2020) developed new aggregation operators, merging FFS with Yager’s t-norm and t-conorm, and applied them in an MCDM scenario of selecting an authentic lab for COVID-19 tests. Keshavarz-Ghorabaee et al. (2020) proposed a methodology using WASPAS (“weighted aggregated sum product assessment”), SMART (“simple multi-attribute rating technique”), and FFS for evaluating and selecting green suppliers in the construction industry, demonstrating its stability and congruence with existing methods through sensitivity and comparative analyses. Aydemir and Yilmaz Gunduz (2020) introduced FF aggregation operators based on Dombi operations, analysed their arithmetic and geometric properties, compared them with existing operators, and applied them in the TOPSIS to evaluate their impact on the MCDM process. Gül (2021) extended SAW (“simple additive weighting”), ARAS (“additive ratio assessment”), and VIKOR (“viekriterijumsko kompromisno rangiranje”) to handle FFD, with application in selecting the best COVID-19 testing laboratory, validating the proposed methods against existing FFS-based decision methods. Jeevaraj (2021) introduced IVFFS (“interval-valued Fermatean fuzzy sets”) as an extension of FFS, established mathematical operations and score functions for IVFFS, compared ranking methods using the proposed score functions, and applied the TOPSIS method on IVFFS to demonstrate their applicability through numerical examples. Rani and Mishra (2021) proposed an integrated decision-making method based on the MULTIMOORA (“multiplicative form of multi-objective optimization based on ratio analysis and reference point approach”), maximizing deviation method, and Einstein aggregation operators within FFS context. They applied this method for optimal EVCS (“electric vehicle charging station”) location selection to effectively handle uncertainty and incorporate quantitative and qualitative factors, providing a robust and consistent approach compared to existing methods.

Mishra et al. (2022b) assessed different barriers in the IoT (“internet of things”) by considering the CoCoSo method in the FFS context for supporting waste management in smart cities. Akram et al. (2022) introduced linguistic FFS as a novel approach to qualitative information processing and decision-making, showcasing its applications in multi-attribute group decision-making and solving practical problems in food company ranking and green supplier selection while comparing its effectiveness with existing methods. Rani et al. (2022) proposed a novel MCDM approach by combining the CRITIC (“criteria importance through inter-criteria correlation”) and COPRAS (“complex proportional assessment”) methods with IVFFS for addressing the imprecise and incomplete information in MCDM under an uncertain environment and demonstrated its effectiveness in evaluating and selecting sustainable community-based tourism locations. Mishra et al. (2022a) introduced IVHFFS (“interval-valued hesitant Fermatean fuzzy sets”), presented various operations, distance measures, and aggregation operators for IVHFFS, and demonstrated their application in MCDM using COPRAS, specifically for the selection of desalination technology, providing a robust and stable method to address uncertainties and influencing factors. Ashraf et al. (2023) developed innovative FFS-based information measures, including distance, similarity, entropy, and inclusion measures, and demonstrated their applicability in pattern recognition, building materials, and medical diagnosis without encountering counter-intuitive cases. Akram and Bibi (2023) introduced an improved version of the PROMETHEE (“preference ranking organization method for enrichment evaluation”) using 2-tuple linguistic FFS for MCDM problems with linguistic variables, demonstrating its effectiveness and reliability in addressing such issues. Zeng et al. (2023) presented a novel framework combining FF hybrid weighted distance measure and TOPSIS for comprehensive evaluation of LCC (“low-carbon city”) quality, addressing challenges posed by uncertainty and complicated indicators, and providing insights for LCC development assessment and decision-making. Saha et al. (2023) introduced two new methods, FF-Delphi for criteria identification and FF-DN MARCOS for criteria weighting, to optimize warehouse location in the automotive industry, emphasizing “energy availability and cost” and “proximity to port and customs” as pivotal factors. Deveci et al. (2023) assessed the risks impacting sustainable mining in Greece, employing a new FF score function with SWARA for risk weighting to find the most crucial risks, aligning with SDG12 and identifying “Risk to Environment” as the highest risk category, thereby offering a roadmap for sustainable mining practices. Zaman et al. (2023) developed new decision-making techniques based on complex Fermatean fuzzy numbers and introduced various aggregation operators like CFFEWAA (“complex Fermatean fuzzy Einstein weighted average aggregation”), CFFEOWAA (“complex Fermatean fuzzy Einstein ordered weighted average aggregation”), and CFFEHAA (“complex Fermatean fuzzy Einstein hybrid average aggregation”), applying them in an extended TOPSIS method for multi-attribute group decision-making, specifically for selecting an English language instructor.

On reviewing the literature on FFS, the following points can be inferred. (i) FFS possesses distinctive characteristics that make it highly advantageous in uncertain decision-making scenarios. (ii) The ability of FFS to manage uncertainty effectively and depict detailed uncertainty representations renders it an invaluable tool for experts. (iii) Integrating FFS into decision models and methodologies enhances the resulting decisions’ dependability, resilience, and precision. (iv) Approaches based on FFS provide a comprehensive and precise assessment of various options, empowering experts with a heightened comprehension of the inherent uncertainty within the decision-making environment. Hence, the authors propose using FFS to precisely depict data to solve the MCDP of CV selection for healthcare centres in uncertain conditions.

2.3Variance, LOPCOW & CoCoSo Methods

Kao (2010) claimed that weights must be determined via a method rather than direct assignment as they tend to be inaccurate and driven by bias. Specifically, variance is a method for weight calculation that resembles human behaviour by considering the hesitation of experts during MCDM. Higher variability indicates high hesitation/confusion from the experts regarding that particular criterion, so uncertainty is high. Hence, the uncertainty of the model has to be measured, which is done using the variance. Optimistically, experts tend to pay less attention to or are influenced by those criteria. Still, from a pessimistic perspective, these criteria are considered vital as they influence the ranking, and such behavioural depiction is possible from the variance measure. Hence, the authors propose utilizing the variance method to effectively capture the experts’ importance within the defined MCDP.

Ecer and Pamucar (2022) proposed the LOPCOW method to generate more acceptable outcomes by addressing significant differences in weight values, negative values, criterion limitations, and data size discrepancies in real-life problems. They benchmarked LOPCOW with other objective weighting methods, such as Entropy and MEREC. Subsequently, they showed that the LOPCOW method achieves a relatively smaller ratio between the most crucial and least important criteria, indicating a more balanced weight calculation capability and addressing the drawbacks of the other methods. Since its introduction, many researchers have utilized the LOPCOW method and its extensions. Simic et al. (2023) proposed an advanced two-stage model under the T2NN (“type-2 neutrosophic number”) environment, combining T2NN-LOPCOW and T2NN-ARAS methods, to support the transition and upgrading of warehouse management systems with Industry 4.0-based solutions. The latter study includes a case study demonstrating the superiority of AGVs as the most favourable material handling solution. Ecer et al. (2023) introduced a practical decision-making framework combining Delphi, LOPCOW, and CoCoSo methods with IVFNN (“interval-valued fuzzy neutrosophic number”) information to evaluate the sustainability performance of MMS (“micro-mobility solutions”), providing insights into critical criteria and identifying the most promising MMS options. Ulutaş et al. (2023) developed a novel integrated MCDM model utilizing PSI (“preference selection index”), MEREC (“method based on removal effects of criteria”), LOPCOW, and MCRAT (“multiple-criteria ranking by alternative trace”) methods to effectively select the most efficient natural fibre insulation material, addressing the complexity of criteria and alternatives in the decision-making process. Nila and Roy (2023) introduced a hybrid multi-criteria decision-making model that combines LOPCOW, FUCOM, and DOBI (“Dombi Bonferroni”) methods with triangular fuzzy numbers to objectively evaluate and select third-party logistics providers for food manufacturing companies. Biswas and Joshi (2023) analysed the performance of IPOs in the Indian Stock Market from 2018–2021, using the LOPCOW method to assess market-based indicators and fundamental efficiency, suggesting that post-listing IPO performance is not necessarily tied to fundamentals and is often influenced by investor speculation, with the LOPCOW ranking method proving consistent with the widely-used Entropy model. From this literature review, the following point can be made about the LOPCOW method: (i) LOPCOW addresses significant differences in weight values, negative values, criterion limitations, and data size discrepancies in real-life problems, ensuring a more balanced weight calculation capability and leading to more acceptable outcomes compared to other objective weighting methods. (ii) Since LOPCOW achieves a relatively smaller ratio between the most crucial and least important criteria, it indicates a more reasonable and balanced assessment of criterion importance, helping experts achieve a more comprehensive and accurate evaluation of different criteria in their decision-making processes. Hence, the authors propose utilizing the LOPCOW method to effectively capture the criteria importance within the defined MCDP.

The CoCoSo method, developed by Yazdani et al. (2019), aims to provide a compromise solution to rank alternatives based on three levels of compromise space: sum, minimum, and maximum. This method aggregates weights of compared alternatives using the multiplication rule and weighted power of distance methods, calculates a ranking index as an aggregate of these three measures, and provides the final ranking of alternatives. Since the inception of CoCoSo by Yazdani et al. (2019), many researchers have utilized this method and its extensions. Wen et al. (2019) employed a probabilistic fuzzy linguistic term set and applied SWARA (“step-wise weight assessment ratio analysis”) along with CoCoSo for the selection of cold chain logistics management for medicine in clinical decision support systems. Banihashemi et al. (2021) utilized triangular fuzzy numbers and the CoCoSo method to investigate the environmental impacts of construction projects. Mishra et al. (2021) employed hesitant fuzzy sets and CoCoSo to rank sustainable third-party reverse logistic providers. Rani et al. (2021) used single-valued neutrosophic fuzzy sets and applied SWARA and CoCoSo to the renewable energy resource selection problem. Deveci et al. (2021) extended the CoCoSo method by incorporating logarithmic and power Heronian functions and applied triangular fuzzy numbers for ranking real-time traffic management systems. Demir et al. (2022) used triangular fuzzy numbers as well as both the FUCOM (“fuzzy composite evaluation method”) and CoCoSo to evaluate the sump development in urban areas. Qiyas et al. (2022) employed logarithmic picture fuzzy sets along with CoCoSo and used this framework for the drug selection for COVID-19. Jafarzadeh Ghoushchi et al. (2023) utilized spherical fuzzy sets and applied the Best-Worst method and CoCoSo to assess strategies for managing the COVID-19 infodemic. Zhang and Wei (2023) employed spherical fuzzy sets and combined CoCoSo and D-CRITIC (“distance correlation criteria importance through inter-criteria correlation”) for the location selection of electric vehicle charging stations. Su et al. (2023) used Pythagorean fuzzy sets along with the CoCoSo method to identify the technical challenges of blockchain technology for a sustainable manufacturing paradigm. Zhu et al. (2023) used an Entropy-CoCoSo framework to evaluate China’s inter-provincial Doing Business environment, finding significant regional differences and suggesting targeted improvements for optimizing business conditions and promoting economic development. Tripathi et al. (2023) introduced an MCDM approach using IFS and CoCoSo, which utilizes a generalized score function and parametric divergence measures for criteria weighting, and it was applied to medical decision-making problems for therapy evaluation. Based on this literature review, the following points about the CoCoSo method can be inferred: (i) CoCoSo is widely used because it provides a comprehensive and compromise-based approach to rank alternatives, considering multiple levels of compromise space and aggregating weights using various methods. (ii) Its ability to handle different types of fuzzy sets and incorporate other decision-making techniques makes it a versatile and effective method for addressing various research problems. Hence, the authors propose utilizing the CoCoSo method to rank the CVs within the defined MCDP.

3.1Preliminaries

Some basic concepts related to IFS and FFS are presented below:

3.2Expert Weight Estimation

This section discusses the calculation of experts’ weights, which were calculated using the variance method. The advantage of the variance method inferred from Section 2.3 is as follows: (i) The variance method effectively captures the hesitation and uncertainty exhibited by experts when assigning weights to different criteria. A higher variance in weight values signifies greater uncertainty, allowing the model to reflect real-world complexities that experts may grapple with; and (ii) This method allows for a nuanced understanding of how experts view the importance of various criteria. From a pessimistic perspective, these criteria are vital as they significantly influence the ranking. This behavioural depiction is made possible through the use of variance, providing a more comprehensive understanding of the decision-making process. The steps followed for the calculation of expert weights using the variance method are given below:

Step 1: Let d experts give ratings on x CVs based on c competing criteria. Likert scales are used for converting the ratings into FFNs. The following points are to be noted:

The dimension of the decision matrices for every expert l is x×c.

Step 2: Calculate the accuracy A(Vijl) of each FFN using Eq. (7). Please note that the dimensions of the matrices remain intact for every expert l after calculating the accuracy.

Step 3: Determine the normalized accuracy AN(Vijl) using Eq. (11). Please note that the dimensions of the matrices remain intact for every expert l after calculating the normalized accuracy.

Step 4: Determine the variance vector for every expert d by applying Eq. (12). Please note that Eq. (12) yields a 1×c vector.

Step 5: Determine the experts’ net confidence using Eq. (13), which is considered the importance of the experts. Please note that Eq. (13) yields a 1×c vector.

3.3Criteria Weight Estimation

This section gives an overview of the steps involved in calculating the weight of the criteria, which was calculated via the LOPCOW method. A few advantages of the LOPCOW method can be inferred from Section 2.3 as follows: (i) LOPCOW method is designed to handle significant differences in the criteria weights, making it more adaptable for real-time problems; (ii) This method can also handle negative values present in the criteria, making it more versatile to different decision-making scenarios; (iii) This method also provides a more balanced and reasonable criteria importance, since it achieves relatively smaller ration between most important and least important criteria; (iv) LOPCOW can also manage data size discrepancies, make it more adaptable to varying size of datasets; and (v) LOPCOW provides a more acceptable and a comprehensive criteria importance in decision-making processes. The steps involved in the calculation of criteria weights using the LOPCOW method are presented below:

Step 1: Let d experts give ratings on c competing criteria. Likert scales are used for converting the ratings into FFNs. The following points are to be noted:

The dimension of the criteria decision matrix is d×c.

Step 2: Calculate the accuracy A(Vlj) of each FFN using Eq. (7). Please note that the dimension of the matrix remains intact after calculating the accuracy.

Step 3: Determine the normalized accuracy AN(Vlj) using Eq. (14). The linear min-max normalization is used in this step. Please note that the dimension of the matrix remains intact after calculating the normalized accuracy.

Step 4: Calculate the percentage values pvj using Eq. (15). Please note that Eq. (15) yields a 1×c vector.

It is to be noted that in Eq. (15), σj represents the standard deviation of the criterion j.

Step 5: Compute the criteria weights using Eq. (16). Please note that Eq. (16) yields a 1×c vector.

3.4Ranking Algorithm

This section elucidates the steps involved in ranking the CVs, which were performed using the CoCoSo method. The advantages of the CoCoSo method can be inferred from Section 2.3 as follows: (i) CoCoSo method provides a comprehensive approach to ranking alternatives by considering three levels of compromise space: sum, minimum, and maximum allowing for a more nuanced and balanced decision-making process; (ii) This method employs multiple techniques for aggregating weights, such as the multiplication rule and weighted power of distance methods enhancing the flexibility of its applicability in various scenarios; (iii) This method captures the behavioural aspects of decision-making, allowing for a more human-centric evaluation that can be more aligned with real-world decision-making processes; (iv) The method’s ability to aggregate weights using various methods makes it well-suited for scenarios where simple weighting schemes may not capture the complexity of the decision-making environment; and (v) The method’s flexibility in aggregating weights allows it to adapt to problems with different scales or units, making it easier to combine disparate types of information into a unified decision-making framework. The steps involved in ranking the CVs using the CoCoSo method are presented below:

Step 1: Let d experts give ratings on x CVs based on c competing criteria. Likert scales are used for converting the ratings into FFNs. The following points are to be noted:

The dimension of the decision matrices for every expert l is x×c.

Step 2: Calculate the accuracy A(Vijl) of each FFN using Eq. (7). Please note that the dimensions of the matrices remain intact for every expert l after calculating the accuracy.

Step 3: Determine the normalized accuracy AN(Vijl) using Eq. (11). Please note that the dimensions of the matrices remain intact for every expert l after calculating the normalized accuracy.

Step 4: Determine the weighted normalized accuracy W AN(Vijl) using Eq. (17). Please note that the dimensions of the matrices remain intact for every expert l after calculating the weighted normalized accuracy.

Step 5: Determine the multi-stage compromise solutions X1l, X2l, and X3l using Eqs. (18)–(20). Please note that Eqs. (20)–(22) yield a 1×x vector for every expert l.

Step 6: Combine the compromise solutions using Eq. (21) to obtain the net ranking vector for every expert l. Please note that Eq. (21) yields a 1×x vector for every expert l.

Step 7: Aggregate the rank values for every expert l using Eq. (22). Please note that Eq. (22) yields a 1×x vector.

The flowchart of the proposed model has been presented in Fig. 2.

Fig. 2

Flowchart of the proposed model.

In Fig. 2, the flowchart delineates a systematic process for evaluating and ranking CVs. The process commences by converting the linguistic data of both alternative ratings and criteria ratings from various experts into FFS. Subsequently, the evaluation splits into two parallel paths: the left focuses on the calculation of expert weights by first obtaining alternative ratings as FS from different experts and then applying the Variance Method, culminating in a derived set of expert weights. The right path is dedicated to calculating criteria weights, which involves obtaining criteria ratings as FS from different experts and employing the LOPCOW Method. Once both weights are ascertained, the CoCoSo method ranks the CVs, resulting in a net-ranking index. The procedure concludes once the final rankings of the CVs are established.

5.1Sensitivity Analysis

This section attempts to understand the effect of criteria weights on the ordering of CVs. For this purpose, we performed weight rotation using a left shift operator that swaps weights between the criteria set to form new weight sets so that every weight value is assigned to every criterion once. Additionally, this gave us ten sets of weight vectors, each of 1×10 order, that were fed as input to the ranking model to determine rank vectors of CVs for different sets. The procedure described in Section 3.4 was utilized to determine CV rank for each weight set.

For each weight set, parameter values are determined for each expert, and net values are calculated. This results in a 1×7 vector obtained for each set. These values are plotted in Fig. 3, which reveals that the ordering is intact and the developed approach is robust to criteria weight shift.

Fig. 3

Sensitivity graph of the framework.

5.2Comparative Analysis

This section provides a bidirectional comparison between the application and method perception. In the application context for CV selection, the authors considered extant models that use IFS and its extensions in the method context. The proposed model was compared with the extant models to understand its efficacy. From the application perspective, models like those proposed by Krishankumar et al. (2020), Dahooie et al. (2020), Hussain et al. (2020a), Hussain et al. (2020b), and Hang Nguyen et al. (2023) were compared with proposed model to understand its efficacy from the application perspective. A comparison of the proposed model and extant models is presented in Table 6.

Some innovative features of the developed model are provided below:

From the method perspective, the models proposed by Senapati and Yager (2020), Mishra et al. (2022b), Rani and Mishra (2021), and Zeng et al. (2023) were compared with the developed framework to determine its consistency level by applying Spearman correlation to the rank orders obtained from each method. It can be noted from Fig. 4 that the proposed framework is consistent with the other decision models with coefficient values of 1, 0.57, 1, 0.57, and 1 for proposed versus other models. Fig. 4 provides the complete correlation plot to show the net consistency effect of the proposed model with respect to other decision models.

Fig. 5

Broadness analysis of the proposed model against other models.

Apart from consistency, we also explored the broadness aspect of the proposed model to give stakeholders a convenient ordering of CVs that would facilitate better backup planning and management. For this, we performed a simulation study with a set of 300 matrices with a 7×10 dimension. The criteria weights were considered as calculated in Section 4. It must be noted that in each set, there are three matrices. All of these matrices were fed as input to the proposed and compared models to determine the rank values of CVs. As a result, we obtained 300 vectors of 1×7 dimension, and the variability was determined for each vector. Subsequently, two vectors with 300 points each were derived, as plotted in Fig. 5. In the proposed framework, rank values from each of the three matrices from a single matrix set were determined and finally fused to determine the cumulative values, upon which variance measure was applied to determine the rank variability. In the model by Mishra et al. (2022b), the three matrices with a single matrix set were first aggregated and later fed to the ranking model to determine rank values. From the plot, it is clear that there are situations where the proposed framework outperforms the extant models and vice versa. Moreover, it is evident that the proposed model can be promptly used by policymakers and experts to gain broad rank values for better planning of the backup strategy and also to gain insights into the ordering of CVs based on individual experts, which otherwise is not possible. Hence, along with broad ranks, we are able to facilitate the personalization aspect better, followed by the cumulative aspect, which is lacking in the extant models.

5.3Discussion

CV selection is an important decision problem aimed at supporting diverse sectors to manage data and resources properly. Since the health industry is packed with crucial and private data, health industries need to maintain such data efficiently and less expensively. Besides, data management must help the health sector’s daily activity; in this aspect, cloud technology is a prominent DT that meets the industry’s demand. However, the hurdle lies in choosing a suitable CV based on diverse criteria and uncertain preferences.

To tackle the challenge, we propose a model possessing integrated decision approaches focusing on the methodical determination of parameter values and reduced human intervention to alleviate biases and inaccuracies in the process. The selection problem involves the consideration of multiple criteria that are QoS presented by the CSMIC as benchmarking factors for aiding appropriate CV selection. Since there are multiple criteria and the opinion of a CV with respect to these criteria is uncertain, the problem is mapped to MCDM. Here, criteria weights are methodically derived, and from the values in Section 4, it is seen that scalability, user-friendliness, and total cost are highly preferred criteria, followed by privacy breach and assurance. Likewise, other criteria preferences are gained. Based on the ranking algorithm, CV A4 is highly preferred, followed by A1, A6, and so on.

The efficacy of the framework was investigated from both the application and methodology perspectives based on Table 6, Fig. 4, and Fig. 5. It is inferred that the proposed framework is methodical and reduces human intervention, subjectivity, and biases. Furthermore, the model demonstrated consistency with respect to other models and the ability to showcase both individualistic and cumulative ranking of CVs with an acceptable level of broadness, which the other models need to improve.