Embedding ensemble learning into simulation-based optimisation: a learning-based optimisation approach for construction planning

2.1 Construction planning and optimisation

Plenty of planning decisions need to be made in the progress of building and civil construction. The optimisation method is a crucial tool for decision-makers to develop a preferred construction planning (Wang et al., 2017). However, the construction is operated in a dynamic environment in which the design, on-site conditions and available resources can frequently change along with construction progress (Collyer and Warren, 2009; Love et al., 2002). Thus, the decision-making in construction management should be adjusted frequently. In addition, the decisions in each construction stage are usually time-constrained due to the rushed schedule before executions (Yu et al., 2005). The decision feedback in a fast time frame is greatly needed in this situation.

To provide timely support for the time-constrained construction decisions, it should both rely on capturing real-time project information and techniques to support efficient decision-making before activity execution (Tavakolan et al., 2019). The emerging data collection technologies (e.g. Internet of things) make real-time information available. However, efficient decision-making support is still required. The usually applied SO is not an ideal approach because it has high computational loads that cannot provide timely feedbacks (Nguyen et al., 2014), or unreliable optimisation quality at fewer computational loads settings (Song and Gu, 2004). This background motivates this research to develop an alternative approach with fewer computational loads for timely and reliable construction decision-making.

2.2 Simulation-based optimisation for construction

Discrete-event simulation (DES) is a simulation technology that conceptualises the status of target system changed after every occurrence of a discrete event (Cassandras and Lafortune, 2009). Construction processes are inherently complex due to their high degree of interaction, interrelatedness and uncertainty (Lu and Olofsson, 2014). This makes DES especially suitable for simulating construction operations and evaluating construction performance (Zhang and Li, 2004; Larsson et al., 2016). Nevertheless, there are still only limited real-world applications of DES in construction (Lu and Olofsson, 2014). Previous research has recognised that the extensive computational loads of DES will impose limitations for its wide applications (Budgaga et al., 2016). In the construction context, the reason causing even higher computational loads to DES are the large array of scenarios in construction. The accumulated computational loads associated with the simulation of numerous scenarios makes DES impractical to analyse all alternatives of construction decisions (Feng et al., 2018).

To avoid alternative enumeration in DES technology, SO is proposed (Cheng and Feng, 2003). The optimisation portion of the SO approach is used to identify optimal and near-optimal solutions from a huge array of possible construction scenarios, whereas the simulation is used to simulate and evaluate the construction performance of the identified solutions (Cheng and Feng, 2003). The SO method has been applied to many aspects of construction planning. AbouRizk and Shi (1994) performed one of the first SO investigations to determine optimal construction resource allocation. In their research, DES was integrated into optimisation iterations to identify the optimal resource allocation. Motivated by the optimisation ability of metaheuristics, Shin et al. (2011) proposed a DES model which incorporates a genetic algorithm (GA) to help contractors find the optimal hoist plans for high-rise building construction. They reported that the proposed method provided hoist plans that satisfied both the cost and time objectives.

2.3 Computational loads deficiency of simulation-based optimisation and potential benefits of machine learning

Even though SO is benefitted from optimisation with high searching ability, it is criticised not feasible for real-time decisions due to its still cumbersome computational loads (Nguyen et al., 2014; Ninić and Meschke, 2015). Based on the SO framework, the optimisation algorithm will perform simulations during every fitness evaluation. The total computational load is affected by the optimisation population (N) and the number of iterations (I) required for convergence. This demonstrates why optimisation approaches that require simulation at every iteration (N·I) are so time-consuming. Furthermore, a simulation will consume time (T) and require simulation replication (M) to provide a reliable result in the stochastic construction environments. Therefore, the total computational load of an SO method can be described as N·I·M·T. As the processes associated with construction projects are complex and highly interrelated, the simulation time (T) is relatively high, which increases the total computational load (N·I·M·T) to a level that is not feasible for real-time decision of construction projects (Nguyen et al., 2014).

Reduction on the size of population of optimisation algorithms can balance the requirement of global optimisation and computational loads, which also indicates that population reduction will offset the optimisation quality (Song and Gu, 2004). To address the computational load challenge, several other valuable explorations have been conducted. Zhang (2008) proposed reducing the simulation replication (M) for non-optimal solutions. This was done by modifying a statistical method in SO that determines whether further replications are necessary. Parallel computing is another solution for reducing the computing time of SO. Yang et al. (2012) chose to run an optimisation in which simulations are computed in parallel. Thus, the computational loads of simulation replication (M) were reduced. On the contrary, Salimi et al. (2018) divided the population into multiple and set the optimisation to be paralleled in high-performance computing (HPC). This significantly decreased the population (N) parameter of computational loads. The parallel computing requires multiple cores or computers that act as platforms. As such, the computational loads stay the same, but the total computing time can be reduced as the computational loads are spread over different platforms. However, for some construction projects conducted under environments without enabling facilities or required network service, it usually lacks the resources required for parallel computing or other HPC. Therefore, it is valuable to explore the computational reduction alternatives to the SO methods that are suitable for the construction contexts.

The method presented in this study is motivated by the emergence of machine learning technology, which is characterised by both real-time feedback ability and high prediction accuracy (Colak and Qahwaji, 2009). A learning model could increase the efficiency of optimisation at every fitness evaluation because it avoids simulation time (T) and replication (M) by learning the construction performance from simulation dataset. It could therefore significantly reduce the overall computational loads by converting the SO's computational loads N·I·M·T into N·I·t (the machine learning feedback time t is extremely smaller than M·T). Moreover, this scale of machine learning does not require extensive computational capacity for model training and operation. Similar examples have already been applied, e.g. supply chain management (Jun et al., 2010) and engineering design (Nakayama et al., 2002), to reduce computational loads. However, the difference from previous research is that the interested parameters in construction contexts are both massive and changeable according to dynamic construction situations. Therefore, the proposed approach did not attempt to completely replace construction simulation, but rather embedded a machine learning algorithm within the SO framework to reduce overall computational loads also to provide reliable optimisation results.

2.4 Ensemble learning method

Machine learning comprises a set of algorithms that can learn from data to make real-time predictions (Yan and Wang, 2014). In all types of algorithms, the main goal of ensemble learning (EL) is to build a unified learning model that combines and takes advantage of different learning algorithms. To this end, EL generates multiple learners that are based on one (homogeneous approach) or different (heterogeneous approach) learning algorithms, and then provides a regression or classification by combining the outputs of every learner. Various studies have demonstrated that EL is more robust when applied to a problem in which a single learning algorithm shows significant performance variation (Zhang and Ma, 2012; João et al., 2012). In this case, the ensemble learning approach will create a stable and generalised purpose learning model for ESO in the application of construction with different scale, category and/or technology.

Although EL clearly benefits data learning, its use is still at an early stage in applications related to AEC (architecture, engineering and construction). Only several researchers have attempted to solve AEC problems with approaches including EL. One example is the pilot study from Cao et al. (2018), in which EL was applied to predict highway project unit price bids. The results demonstrated that EL provides more stable and efficient unit price prediction than machine learning based on a single learning model. Wang et al. (2012) applied ensemble ANN to predict the cost and schedule success of construction projects. The dataset, which covered 92 projects, showed that ensemble ANN outperformed single ANN in terms of prediction accuracy.

EL approaches for ensemble generation and combination which employ multiple learners ensure more stable and generalised learning than approaches relying on the algorithm to develop a single learner (Webb and Zheng, 2004). The present study investigated whether the ability of real-time feedback, efficiency and generalisation of EL – when compared to the relatively computationally intensive SO framework and single learning method – can be harnessed in the context of a construction project.

3.1 Simulation dataset generation

It is important to establish a specific and appropriate sampling method during the first stage of ESO framework, as it both should ensure the accuracy and efficiency of EL model development. A sampling engine majorly based on the LHS framework was employed to generate construction scenarios. The proposed random scenario engine meets the requirement of ESO, namely, it can generate a representative construction dataset with only limited size of samples. Thus, this random scenario engine will not cost too much time on sample generation and that may offset the advantage of efficiency. LHS samples various construction parameters, including construction technique, crew size and equipment, among others. Figure 2 demonstrates how LHS sampling can be applied to an example problem with two parameters and four samples. LHS sampling proceeds over two stages in this study. First, LHS divides construction parameter values into various portions characterised by equivalent probabilities, i.e. A1 to A4 and B1 to B4 in Figure 2. Then, the divided portions in the first stage are selected, and each portion in related dimension will be selected only once time. The parameter values in the selected portion are sampled by the original probability distributions, i.e. as F_a(x) and F_b(x). Therefore, LHS ensures that each scenario satisfies the original probability distribution and that the scenarios are not too centralised into a high probability space. LHS is a very classical method especially suitable for situations in which a limited number of samples are used to represent whole solution space (Eglajs and Audze, 1977).

To properly evaluate the performance of various construction scenarios, the proposed method simulated construction processes using DES. This decision was motivated by the fact that DES provides detailed process data that supports the evaluation of various construction aspects, such as cost, duration and greenhouse gas (GHG) emission estimations. The applied DES used construction plans as an input and provided construction performance as the output. These inputs and outputs are then used for EL model training, validation and testing. The developed DES model is validated by input-output validation proposed by Banks (1998). The DES model is considered valid if simulation results are statistically agreed with the actual project. The Wilcoxon signed-rank test is applied to test the agreement as many factors in construction are non-normally distributed.

An appropriate number of simulation replication is required for DES to ensure a satisfactory level of accuracy in the stochastic construction environments. To generate reliable samples for the EL model, the present study used the method by Lorscheid et al. (2012) to determine the number of simulation replications, which follows how the coefficient of variation (Cv = standard deviation/mean value) changes as the number of replications (m) increase. Thus, the appropriate number of replications (n*) that ensures a satisfactory level of accuracy can be identified by finding the point (minimum replications) at which the variation (Cv) across simulations becomes stable and below a specified threshold (E) (see Eq. (1)). Then, the simulation replication can provide the reliable evaluation, e.g. with average performance for construction dataset generation.

3.2 EL model establishment

3.3 Learning-based optimisation

The developed EL model was then integrated into an optimisation algorithm to provide efficient evaluations during optimisation iterations. In this study, the developed EL model was integrated into a PSO algorithm to perform learning-based optimisation. PSO was originally formulated by Kennedy and Eberhart (1995), and is a suitable tool for multi-objective optimisation mainly due to fast convergence ability (Kennedy et al., 2006). Another advantage of using PSO for multi-objective optimisation is that this algorithm can readily achieve a non-weight multi-objective optimisation by defining multiple objectives as a vector in a particle position. The Pareto solutions that are non-dominated with each other on all objectives are obtained by PSO.

Based on the PSO mechanism, EL model will be invoked during each fitness evaluation. Then, the particle swarm will refresh or keep the global and local best information based on fitness results. The particle velocity will be updated, and particles will search new construction scenarios. In this way, the particle swarm will move to positions (scenarios) that show better performance by using information from previous individual positions, as well as the total swarm's positions.

The ideal size of the PSO population depends on the problem that is being optimised (Bratton and Kennedy, 2007). Rohler and Chen (2011) verified that a reasonable PSO population ranges from 10 to 40. In this study, a sensitivity analysis was conducted to identify the appropriate PSO population and performance tendency in the ESO framework. According to a previous study (Feng et al., 2018), the 500 PSO iterations applied in this study is an acceptable amount for construction planning optimisation when considering aspects of quality and time. As the ESO approach provides efficient optimisation, a replication mechanism can help the algorithm yield superior results with only limited computational loads. For this reason, a replication mechanism was set for learning-based optimisation. The optimisation quality is the measurement of searched Pareto solutions when compared with other set of Pareto solutions. The acceleration constant and inertia weight values were initially set based on previous construction applications (Wang et al., 2017), and will be modified if necessary (see Table 1).

3.4 Pareto solution refinement

The Pareto solutions will be obtained by determining the exact performance of pseudo solutions and removing solutions that are dominated by others. The inherent knowledge of the relationship between construction planning and project performance contained in the EL model ensures that the searching trajectory of ESO converges to actual optimal solutions. However, these searched solutions are still pseudo-solutions because the fitness evaluation is based on a learning model. In order to determine the exact performance of pseudo solutions, the inputs of these solutions, i.e. the considered construction parameters, are provided to the DES model to simulate. Then, after an evaluation of the exact performances, the dominated solutions are removed and the remaining solutions are Pareto solutions.

4.1 Optimisation evaluation

Evaluation indicators will be used to evaluate and compare the proposed ESO approach with the classical SO method. The ultimate objective of both of these methods is multi-objective optimisation. Thus, the optimisation quality should be evaluated based on the identified Pareto construction solutions. The hypervolume comparison method, proposed by Zitzler et al. (2003) and described by Eq. (8), can quantitatively compare the performance of different Pareto fronts. In this study, the method was used to evaluate the construction solutions obtained through different optimisation methods. The hypervolumes for the solutions of two optimisation approaches applied to a two-objective problem are illustrated as Figure 5. The hypervolume indicator can detect the situation that one Pareto front (A) is not worse than another front (B) when every solution in B is weakly dominated by at least one solution in A. This means that the comparison is capable of evaluating the Pareto front regardless of the number of solutions.

4.2 Method prototyping

A prototype was developed based on the proposed ESO approach to validate model efficiency and effectivity. The discrete-event simulation in ESO was developed within the Simio^TM platform (version 10; Simio LLC, Sewickley, PA), while the EL model and multi-objective PSO were programmed in Matlab^R (version R2017a; Mathworks, Natick, MA). Data exchange between simulation, optimisation and learning models was facilitated by programming an API framework. Most importantly, all of the computing was performed on an office-level laptop with an Intel(R) CPU i5-8300H, 2.30 GHz with 4 cores. Prototype will execute automatically of ESO approach, and progressed from data generation, model training and model testing to planning optimisation (Figure 6). The detail pseudocode for the ESO framework can be found in Appendix 1.

4.3 Application of the developed ESO

The presented ESO approach was developed as a computational reduction approach alternative to the conventional SO method. The decision to embed an EL model within the SO framework was motivated by the need for an efficient connection between the simulation and optimisation modules to reduce the computational loads associated with the conventional SO framework (see Figure 7).

In order to apply the developed ESO approach to a construction project, the decision-maker should start by developing the simulation model and programming the optimisation algorithms, as is the case in the conventional SO framework. Next, an EL algorithm will be programmed and embedded between the simulation and optimisation modules of the SO framework, as shown in Figure 1. The decision-maker can select the preferred construction alternatives for optimisation, and they should be defined and manipulated in the simulation model just like SO framework along with the project progress. After these steps, the ESO is ready to run the construction optimisation.

Ideally, the ESO will provide a final Pareto front of solutions that compares to what would be identified by SO, yet at noticeably lower computational loads. This means that ESO could be run on the standard computing platforms already available at construction sites, i.e. personal desktops and laptops. Therefore, the benefits of ESO are most obvious when real-time optimisation support are required but HPC is not available.

5.1 Case information

The presented optimisation method and prototype were applied to a real-life large-scale construction project located in Shenzhen, China, to test its performance to the construction optimisation. The selected construction project includes three residential buildings (total area 64,050 m², 30 floors) with a reinforced concrete framework. This project was chosen because, on one hand, the project duration, estimated at more than two years. Thus, the project environment may vary multiple times during the project duration, which will influence the optimality of the original plan determined at the planning stage. Moreover, the project includes complex processes because the construction will use both precast (PC) and cast-in-situ (CS) construction. The external walls, internal walls, beams, slabs, balconies and stairs are PC components, while other components, including all of the columns and parts of beams and slabs, will be constructed using CS method. The PC and CS activities cause interaction with each other during construction; therefore, it is a challenge to identify the optimal construction scenario. The above features make this case suitable to apply and compare the proposed ESO with conventional SO method.

The processes involved in standard floor construction of the case building, depicted in Figure 8, are surveyed according to construction planning documents and the on-site manager. These processes include construction activities and involve the corresponding supply chains of PC components and CS materials. As such, efficient floor construction must consider the interaction between PC and CS construction, as well as the interactions between construction and material supply logistics. Based on Figure 8, the PC components should arrive at the construction site before they can be hoisted and installed. However, a certain share of the PC components will be returned if they do not pass the quality check. Furthermore, certain PC components need to be installed before other PC components. According to the on-site manager's expectation, the installation of PC components and temporary supports needs to be adjusted based on project-specific circumstances, which makes part of PC installation slower than predefined performance. To make the situation even more complex, the concrete pump cannot be started until all PC components, CS rebar and formwork of the floor have been installed, and the construction of the next floor will not start before the CS concrete on this floor has been cured for 12 hours.

Dynamic factors of the construction, such as available equipment (R₁) and crew (R₂) could change as construction progresses. Additional dynamic factors include the share of unacceptable PC materials and installation productivity, while unexpected situations can arise during the construction process. Thus, it can be expected that several optimisation runs will be needed to adjust the previous optimal solution to the current project environment. The frequency of adjustments will increase if the project occurs in a highly dynamic environment, which is usually the case for construction projects. In the investigated case, the initial plan for standard floor construction was based on managers' experiences from previous project environments. As such, the managers expected to have 100 and 60 workers available for PC component installation and CS rebar processing, respectively. However, at the start of standard floor construction, the managers only had 80 and 40 workers available for PC and CS processes, respectively. This was the result of one of the labour firms cancelling the contract with the project contractor due to cooperation failures. Therefore, the original optimal plans needed to be immediately adjusted to the new project environments before standard floor construction could be started.

The alternative plans for standard floor construction after the construction document review and discussion with the on-site managers are listed in Table 2. The new number of on-site workers can also influence the supply chains and equipment. Therefore, the alternatives also include appropriate numbers of PC transport trucks, concrete pumps, construction lifts and cranes, as well as the PC supply chain mode. All these alternatives can be adjusted before the construction of standard floor begins. The supply chain has two modes, the first being just-in-time (JIT) mode, in which the PC components are hoisted and installed immediately after arrival on-site. In this mode the PC components cannot be stored at the construction site. The other mode is the traditional on-site storage mode, in which the PC components are stored at the construction site before they are hoisted. Theoretically, JIT mode provides savings in terms of on-site re-transportation time, cost and emissions, while storage mode reduces the risk of off-site transportation delays.

The productivity of equipment, along with rental cost and energy productivity, was surveyed from equipment properties, a local Construction Engineering Quota database (SCPCM, 2016b, 2016a), and contractors' previous records. Whenever the project environment changes, contractors need an efficient tool that will provide optimal plans for their on-site decisions. The presented ESO approach and conventional SO were applied and compared in this case project.

Finding a balance between multi-objectives is a critical part of construction decisions (Feng et al., 2018). Project duration and cost are two most commonly considered objectives in construction optimisation (Eshtehardian et al., 2009; Zhang and Ng, 2012). However, the negative effects of GHG emissions, i.e. global warming, have caused construction managers to include environmental performance in their evaluations of construction operations (Kamali and Hewage, 2017; Mao et al., 2013b). This case project will be the tallest high-rise building with an integrated shear wall structure in southern China; therefore, including environmental perspectives in the optimisation can serve as a benchmark for future construction projects. In this case, the construction duration, the cost for labour and equipment, as well as construction-associated GHG emissions were the multi-objective indicators. The productivity and electrical/fuel consumption of the construction equipment and vehicles, along with the productivity of labourers (see Table 2), were included in the developed DES model. Table 3 shows the GHG emissions and costs of the electricity and diesel consumed during the construction operations.

5.2 Setup of ESO approach

The logic flow of the standard floor construction, including all tasks, associated resources and efficiencies, are developed into a construction DES model (details see Table 4). The input-output validation method is applied to validate the developed DES model. The input of simulation is the original planning in construction documents. The output of the simulation is the simulated results of the construction duration, the cost and GHG calculation, which are compared with actual performances planned in documents and quantity calculation (i.e. theoretical values). The DES model is validated, and the results are shown in Appendix 2.

And the appropriate simulation replication that ensures a satisfactory level of simulation accuracy under uncertainty is determined by coefficient of variation (Cv) method of Lorscheid et al. (2012), as Eq. (1). Figure 9 demonstrates that for the investigated case, the Cv of construction time, cost and GHG stabilises (under 0.1% difference) when 26 or more replications are performed. Thus, the minimum number of DES replications for the case study was set at 26. The parameters in the proposed ESO include structure of multiple/combination learners, number of samples and number of particles in PSO. And all of them will be analysed in following sections. The values for parameters in ESO are summarised in Table 5.

To test that the EL-based learning model can accurately extract construction information from DES, firstly, 800 samples were used to train, validate and test the EL model. The regression plots of actual versus predicted values for GHG emissions, time and cost of the testing samples are shown in Figure 10. The R² and coefficient a (y = ax + b) for all three objectives are close to 1. According to the standard presented in Gilliland's research (Gilliland, 2010), the MAPE results for all three construction objectives could be regarded as “good” because all values fell below 20%. And as for NRMSE, no widely agreed standard exists for the field of construction. However, based on Hall's research (i.e. NRMSE < 5%), the time and cost performance are both “reasonable”, while GHG performance is slightly below the standard (Hall et al., 2014). These results demonstrate that the developed EL model can accurately predict construction performances and, as such, can serve as an accurate connection between the simulation and optimisation modules in developed ESO approach.

6.1 ESO parameter and SO comparative analysis

The applicability of the presented ESO framework to construction projects was tested by analysing how changes in certain model parameters affect optimisation performance. The normalised hypervolume indicator NH was used to represent the normalised optimisation quality, with variation (Var.) and average improvement (AI) defined by Eqs. (9) and (10). The results illustrated in Figure 11 imply that two features of ESO affect optimisation performance. The first is the sample size used for model training, validation and testing; this factor influences optimisation performance because it determines how similar the learning model is to the actual optimisation space. The second feature affecting the optimisation quality is the size of the particle swarm, which influences optimisation performance by determining the searching ability of the optimisation algorithm.

The results illustrated in Figure 11 show that ESO demonstrated distinct improvement in terms of optimisation quality as the size of the sample increased to a satisfactory level, i.e. from 50 to 100 in this case. The variation in optimisation quality also decreased substantially when the sample size reached 100. At this point, the optimisation quality will marginally improve (by less than 5%) as the sample size increases, while variation will stay at a stable level of under 3%. Increasing the sample size from 800 to 4,000 shows average improvement of 0.03%, which indicates that optimisation quality achieves a stable point at a sample size of 800. As for the size of the particle swarm, the results show that this feature can affect the quality of ESO when sample size is held constant. However, the results did not reveal a consistent trend regarding which particle swarm size is most suitable across different sample sizes.

To substantiate the benefits of the proposed approach, the performances of ESO and conventional SO were compared. The developed SO is from AbouRizk and Shi's, (1994) previous works, and more details can be referred at Appendix 1. The results presented in Figure 11 demonstrate that SO has reduced optimisation quality from 0.996 to 0.947 if the particles are set from 40 to 10. But in this situation, ESO in 400 samples and more has outperformed performance than SO, both in terms of optimisation quality and variation (see Figure 12). As the sample size grew, i.e. with 800 samples and more, ESO has superior optimisation performance relative to SO with 20 or 30 particles. The ESO with 40 particles is slightly inferior to the SO with the best parameter setting. Therefore, these results demonstrated that ESO outperforms SO when they have a low search ability, while ESO is slightly inferior to SO when they have a high searching ability. These results are consist with what has been presented in previous research, i.e. a learning model can outperform a SO method in terms of optimisation quality when the learning model and optimisation algorithm are well defined (Jun et al., 2010).

The key motivation for developing the ESO method was significantly reducing the computational loads of SO and providing efficient optimisation that is practical for use at a construction site. Figure 13 shows that ESO – under satisfactory conditions, i.e. 100 samples and 40 particles – achieved significant reductions in the computing time associated with the SO method; more specifically, when the particle size was kept constant (both methods had 40 particles), ESO reduced SO computing time by 96.75%. At larger sample sizes, this reduction in computing time was not as significant, yet nevertheless obvious. For example, ESO with 800 samples and 40 particles reduced the computing time of SO under the same settings by 93.53%. However, the computing times of ESO and SO become more comparable at larger sample sizes. For example, performing ESO with 4,000 samples with 40 particles took 3.72 × 10⁴ seconds, which represents a 72.65% reduction in the computational loads of the corresponding SO method. Therefore, applying a large sample size to the training, validation and testing of ESO can partly offset the advantage of computing time reduction. In this case it is important to consider the results depicted in Figure 11, namely, optimisation quality improvements become marginal once the sample size exceeds a satisfactory point. Therefore, applying the ESO approach using satisfied samples is able to noticeably reduce computing time and provides optimisation quality that is comparable to what is observed for the SO method, simultaneously. Sample sizes that exceed the satisfactory point will slightly offset the computing time benefits of ESO without noticeably improving optimisation quality.

To further investigate the influence of sample size on different optimisation performances, the learned optimisation spaces by ESO were compared for different sample sizes. A total of 1,000 random construction samples was used to investigate how the learned optimisation space under different ESO settings compared to the actual optimisation space. The results depicted in Figure 13 show that the learned optimisation space of ESO with 200 samples is far more similar to the actual optimisation space than the learned optimisation space of ESO with 50 samples. In these situations, the ESO will explore the optimisation space in a way that is similar to SO. Theoretically, ESO provides more stable optimisation quality with higher sample size, which was already demonstrated in Figure 11. As the results illustrated in Figure 14 (a, b, c, d) reveal, the learning model successfully interacted with the solution space across all sample sizes. This is an important result, as it demonstrates that the developed algorithm adopts the correct exploitation direction with all sample sizes. ESO trained with more samples will show a learned optimisation space that closely resembles the actual optimization space and, hence, will effectively mimic the conventional SO framework. On the other hand, ESO trained with a limited number of samples will still adopt the correct optimisation direction albeit with a loss in optimisation quality.

As the necessary number of optimisation particles should depend on the required searching ability of a specific optimisation problem, more optimisation particles may be required in various applications. Figure 15 shows the optimisation quality and computational loads reduction (relative to SO) of ESO across different numbers of optimisation particles. The presented results show that the computational loads reduction of ESO trained with 100 samples relative to SO is positively related to the number of particles, i.e. progressively increases from 10 to 60 particles. More specifically, ESO reduced the computational loads associated with SO by 91.6%–98.4% as the number of particles increased from 10 to 60. The optimisation quality, on the other hand, of ESO exceeded the minimum value of SO when ESO was trained with 100 samples and 50 particles. ESO trained with 100 samples did not outperform the optimisation quality provided by SO at other particle sizes. However, the largest difference between ESO and SO in terms of performance was only 2.3%; thus, the performances of ESO and SO were comparable when between 10 and 60 particles were applied. To summarise, the computational loads reduction conferred by ESO was more distinct as the increase of required searching ability. Furthermore, neither ESO nor SO showed any consistent superiority in optimisation quality.

As the minimum amount of simulation replication depends on the degree of project uncertainty, more replications are theoretically required for highly uncertain construction projects. A previous construction simulation study (Krantz et al., 2019) reported that an extensive number of replications (50) is required for the optimisation of road construction. Thus, the proposed ESO and SO were also subjected to various amounts of replication to gauge their respective computing time requirements. The number of iterations was set at 100 to minimise the influence of convergence uncertainty, while 100 training samples and 40 particles were used in the models. Figure 16 shows that the ESO approach provides large reductions in computing time as the amount of replications increases. The observed time reduction stabilised (around 90%) when the number of simulation replications surpassed 26, while the net computing time reduction provided by ESO was positively related to the number of simulation replications. Therefore, the results indicate that ESO does not need significantly more computing time when higher simulation replication is required.

Therefore, the proposed ESO has several advantages over SO:

1. A well-defined ESO significantly reduces computational loads when compared to SO, yet provides similar optimisation quality (see Figures 11 and 13);

2. When the optimisation has a low level of searching ability, ESO outperforms SO both in terms of optimisation quality and variation (see Figure 12);

3. In situations that require higher searching ability or more simulation replications, ESO can reduce more net computational time compared with SO (see Figures 15 and 16).

6.2 ESO learning method analysis

The chosen learning method is critical for the accuracy of EL. As such, it is necessary to reveal how the training samples and structure of the combination model influence EL accuracy. The performed analyses considered between 50 and 800 training samples, along with combination models with structures ranging from simple to complex, i.e. 120-3-3, 120-10-3, 120-10-10-3 (two hidden layers), respectively. The results in Figure 17 show that the accuracy of the EL model improves as the sample size increases, reaching a stable point at a training sample size of 100. As for the combination model, ESO applying the 120-10-10-3 model showed exhaustive computing time when trained with a small number of samples (e.g. 50). This scenario yielded numerous pseudo solutions, 2,549 to be exact, so the algorithm spent far too much computing time on Pareto solution refinement. Hence, the 120-10-10-3 combination model is impractical for the construction context as the exhaustive identification of a Pareto front offsets the benefits of a developing an approach that is more efficient than conventional SO. The 120-10-3 and 120-3-3 combination models are more practical for decision-makers in the specific case presented in this study. The results revealed that the 120-3-3 network is most suitable in the EL model across sample sizes ranging from 50 to 800. As illustrated in Figure 17, the more complex 120-10-3 structure results in slight overfitting at small sample sizes, which makes the machine learning model less accurate than the model resulting from the 120-3-3 structure.

In order to measure the performance of ESO by EL model with multiple learners, the performance of the ESO applying EL was compared to methods that applied single learning model, including Bayesian regularization backpropagation neural networks (BRBNN), extreme learning machine (ELM) and regression tree (RT). According to the aforementioned analyses, 100 samples ensures satisfied optimisation quality, efficiency and stable results, while a particle swarm size of 40 provides the best optimisation quality. Thus, these settings were used to test how various learning algorithms affected ESO performance. Table 6 demonstrates that ESO applying EL outperformed the other single learning models in terms of NH. In other words, integrating EL into the optimisation model provides the best optimisation quality. The model that applied ELM demonstrated the shortest training time, which is consistent with previous evidence that ELM is a fast learning algorithm (Huang et al., 2006). This study proposed a machine learning approach to combine multiple learners. The utility of this approach was compared with the commonly applied weighting method, which uses the average weight (AW) for every learner during model combination. Table 6 shows that EL with the proposed machine learning method outperforms the usually applied average weight method in terms of optimisation quality.

The constituent parts of the total running time for the proposed ESO were also revealed. The proposed ESO approach includes three distinct parts of computing time: learning model training, optimisation and Pareto solution refinement. Figure 18 illustrates that learning model training accounts for one of major computing time, with the EL approach having the longest computing time of all the tested learning algorithms. This is reasonable because multiple learners need to be trained in EL.

6.3 Case application and results

The developed ESO approach was finally used to simulate and optimise the objectives (cost, duration and environmental perspectives) of the case construction project. Based on the procedure depicted in Figure 7, the alternative construction scenarios listed in Table 2 were defined in the developed DES simulation model. As in the previous analysis, the number of particles in the PSO algorithm was set to 40, while the EL model was trained with 100 samples. After these steps, the ESO is able to provide an optimised construction solution.

As a result, nine Pareto construction solutions (see Table 7) were obtained after about 1.22 hours of computing time by ESO. In contrast, the SO method with 40 particles included 37.78 hours of computing time. Hence, the on-site manager was provided with a solution (the proposed ESO approach) which yields alternatives that can support decision-making in just over one hour as compared to over day and a half, representing a computing time reduction of 96.75%. As for the optimisation quality, the ESO approach was 6.02%, i.e. (0.996–0.936)/0.996, worse than SO in terms of normalised optimisation quality NH.

As can be seen in Table 7, the proposed ESO approach yielded nine non-dominated Pareto solutions (#1∼#9) according to the multiple objectives, and they all dominate a random, non-Pareto solution. Pareto solutions #5, #1 and #9 represents the ideal solution for GHG emissions, time and cost, respectively, while the other solutions provide trade-offs between the various objectives. The contractor is then able to use the obtained Pareto solutions to efficiently make a decision.