3.1. Formalisation of the application

Given a set of n candidate development paths (referred as alternatives a_i, i = 1,...,n), a set of m criteria (c_j, j = 1,...,m) and their corresponding weights (w_j, j = 1,...,n), and an initial assessment matrix X = (x_ij)_n×m, the utimate target of the application is to select the best candidate path(s) based on available information. This formalisation is a typical multi-criteria decision making configuration without any other specifications. In this paper, we require x_ij to be a complex-valued membership degree of an underlying CFS F˜j , j = 1,...,m.

3.2. Outline of the SME-C method

The steps of the SME-C method are briefly listed below:

• Step 1

  Normalise initial assessment matrix X to normalized assessment matrix X¯ ;

• Step 2

  Generate weighted assessment matrix X^ from X¯ ;

• Step 3

  Calculate aggregated assessment S_i for each alternative;

• Step 4

  Rank S_is based on partial order given in Eq. (8).

3.3. Normalisation of initial assessment matrix

That normalising initial assessment matrix is commonly attribute to two practical purposes: 1) to make the comparisons between different criteria on a unified measurement scale; and 2) to make the following calculation or operation confined to specific properties. In the SME-C method, this step is optional when setting x_ij to be a complex-valued membership degree. When the requirement is not satisfied, we need to normalise the initial assessment matrix X to meet the aforementioned two purposes. Hence, we give two possible normalised methods, named type-I and type-II.

3.4. Generation of weighted assessment matrix

This step aims at measuring the influence of each criterion c_j by importing its corresponding weight w_j into the normalised assessment matrix. For any x˜¯ij , the weighted assessment is defined as x˜¯ij=wjx˜¯ij , i = 1,...,n, j = 1,...,m. Obviously, x˜^ij∈Dℂ and Σi=1n x˜^ij∈Dℂ .

3.5. Calculation and ranking of aggregated assessment

By Eq. (6) and the fact that Σi=1n x˜^ij∈Dℂ , we define the aggregated assessment Si=Σi=1nx˜^ij . Once S_i is obtained, we can rank them by the partial order given in Eq. (8). This is a straightforward step.

4.1. Background

Chongqing is the fourth municipality of China. It is historically a heavy and military industry base because of its remoteness in geography. With the acceleration of China’s National Western Development Strategy, more and more new economy forms have been developed in the past two decades. Small and medium-sized E-commerce enterprises have rapidly emerged in last 10 years. However, due to the inland location and limited volumes of products and services, these enterprises face numerous constraints on e-commerce development. In this study, we choose one typical enterprise as illustrative example to solve its development path selection issue. There are three potential paths for the enterprise to choose from. Path 1 is Whole course E-commerce model based on cloud computing. Path 2 is Location based service (LBS) model based on E-commerce integrator (E-integrator). Path 3 is third party market mode based on information technology. To make sure which path is the best for the enterprise, a third-partied consultancy has identified seven criteria to measure which are Core Strategy Management (c₁), Learning and Capability Development (c₂),Information and Communication Technology (ICT, c₃), Convenience and Security of Data Information (c₄), Cost (c₅), Product and Service (c₆), and Enterprise Stakeholders (c₇).

Regarding to each individual criterion, the consultancy defined its optimisation direction and weights for each alternative path which are listed in Table 1. In these seven criterion, two are negative. For cost (c₅) criterion, it is obvious that the less the cost, the better for the enterprise. For Enterprise stakeholders (c₇), we argue for the small enterprise, the less the stakeholder, the easier for them to make new measures.

In these seven criterion, we argue that criteria c₂, c₅ and c₇ are periodic. When the enterprise face a new circumstance, people need spend more time to learn it. With the increase in learning time, people are more and more skilled and therefore improve significantly work efficiency and increase adaptability. Finally everyone will get used to it. When facing new circumstance again, the same process repeats. So we argue learning and capability development (c₂) is a periodic criterion. According to the degree of learning difficulty, the paper define c₂ a (0,π/2) periodic criterion. In enterprise development, cost (c₅) and stakeholder relationship (c₇) are affected by many factors and often depict periodic features. Hence the paper defines them as periodic criteria and assigns a (0,π) period.

With respected to the seven criteria, evaluations on the three paths are given (see Table 2) based on underlying CFSs of those criteria.

In order to rank the potential paths, we apply the SME-C method. The ranking is conducted as follows:

• Step 1: Normalise assessment matrix X

  Let X=(x_ij)_7×3 be the initial assessment matrix given in Table 3.

  As discussed above, we use the type-I normalisation for illustration purpose. For j = 1,

  ΔI,1=2+3+1=6.
  Hence, the type-I normalisation result is 0.400 + 0.000i (a₁), 0.333+0.000i (a₂), 0.267+0.000i (a₃). Similarly, we can calculate the normalised assessments for other criteria.
  (0.333+0.000i0.500+0.000i0.167+0.000i0.167+0.000i0.254+0.430i0.289+0.167i0.167+0.000i0.333+0.000i0.500+0.000i0.500+0.000i0.333+0.000i0.167+0.000i0.000+0.500i−0.236+0.236i−0.167+0.000i0.500+0.000i0.333+0.000i0.167+0.000i0.000+0.167i0.255+0.430i0.289+0.167i)

• Step 2: Generate weighted assessment matrix X^

  Noted that x˜^ij=x˜¯ij⋅wij , we get X^ as below

  (0.033+0.000i0.050+0.000i0.017+0.000i0.017+0.000i0.025+0.043i0.029+0.017i0.017+0.000i0.033+0.000i0.050+0.000i0.100+0.000i0.067+0.000i0.033+0.000i0.000+0.100i−0.047+0.047i−0.033+0.000i0.100+0.000i0.067+0.000i0.033+0.000i0.000+0.017i0.025+0.043i0.029+0.017i)

• Step 3: Calculate aggregated assessment S_i

  For each alternative, the aggregated assessment S_i is calculated based on Eq. (6). Here, we can simply add the weighted assessments for each alternative; therefore, they are shown in Table 4.

• Step 4: Rank alternative paths

  Based on the aggregated assessments and Eq. (8), path a₁ is the best path and then followed by a₂ and a₃.

4.2. Discussions and comparisons

In this section, we will compare the presented SMEC method with other two popular multi-criteria decision methods, i.e. the COPRAS and the TOPSIS. We choose these two methods because they have similar processing steps and they need to identify positive and negative decision direction which we can use the phase part of a complex-valued membership degree to imitate.

The COPRAS method is a widely-used multi-criteria decision making technique, which contains three main steps ³⁶: (1) normalises initial assessments regarding to each individual evaluation criterion; (2) calculates two optimisation indexes for each alternative based on criteria’ optimisation directions (decision directions); and (3) ranks alternatives based on an overall index calculated from optimisation indexes. These steps are briefly described below.

Suppose X is the initial assessment matrix

After getting the weighted assessment matrix X^ , the COPRAS needs to calculate optimisation indexes determined by the preferable optimisation direction of each criterion. A c_j is associated with one of two preferable optimisation directions, i.e., positive (the bigger the better, a.k.a. “optimisation direction is maximisation”) or negative (the smaller the better, a.k.a. “optimisation direction is minimisation”). Without loss of generality, let C⁺ be the set of criteria with positive optimisation direction and C⁻ be the set of criteria with negative optimisation direction, then for each alternative a_i ∈ A two optimisation indexes corresponding to C⁺ and C⁻ respectively can be calculated as

Using these two optimisation indexes, an overall ranking index Q_i is therefore calculated for each alternative a_i:

By using the COPRAS method, we get a similar ranking with the following reference indexes (Table 5).

The TOPSIS (Technique for Order of Preference by Similarity to Ideal Solution) may be the most-used multi-criteria decision making method, which has many different extensions. TOPSIS has two main difference compared with the COPRAS method. The first one is the normalisation method used. TOPSIS adopts the vector-based normalisation, i.e.

By using the TOPSIS method, we get a similar ranking with the following reference indexes (Table 6).

Our previous experiments indicate, the TOPSIS and the COPRAS methods can produce similar ranking in most situations. In this example, we get the same ranking using three different methods.

5.1. Summary

The purpose of this paper was to contribute towards an analytical understanding of E-commerce development path in SMEs. We summarised three development paths for SMEs, identified seven different criteria and evaluated them with CFS. Finally we compared the results with other two popular methods (COPRAS and TOPSIS).

5.2. Limitations and Suggestions for further study

It is inevitable that researchers deal with some limitations in their studies and the present study is no exception. These limitations set stage for future research.

Firstly, this study used a limited number of experts from a third-party consultancy. Future research may repeat this method using multiple experts to justify the validity of the study.

Secondly, it should be mentioned that understanding the barriers and drivers of SME-C implementation helps E-commerce to introduce costly effective practices. So, further research will attempt to focus on this issue.

Thirdly, this research has explored only one case study in a small E-commerce enterprise. Hence conclusions may not generally suit various companies and industries. Future works should conduct research related to investigation on E-commerce practices and performances in different sectors.

Finally, identifying weights and decision direction is an important issue in the evaluation of enterprise development strategy. In the presented work, we used a predefined weights and direction from the consultancy. We noted that this may include too much personal or subjective opinions and we could improve it by using pairwise comparison like that used widely in fuzzy AHP research area ¹³. This may require more discussion about how to efficient calculation on CFS. We will work on this in future work.