Abstract

Background. Clinical comprehensive decision-making of diabetic ulcers includes curative effect evaluation and curative effect prediction. Nevertheless, there are few studies on the prediction of diabetic ulcers. Methods. Set pair analysis (SPA) was used to assess the curative effect evaluation, and therapeutic effect was evaluated by connection degree (CD). The higher-order Markov chain-SPA curative effect prediction model was established to predict the future curative effect development. The predicted results with higher-order Markov chain-SPA and traditional first-order Markov-SPA model were compared with the actual results of the patients to verify the effectiveness of prediction. Results. The connection degree of index levels I and II of 15 patients with diabetic ulcers after traditional Chinese medicine (TCM) treatment increased with time, while that of index levels IV and V decreased, indicating that the curative effect tends to improve. The higher-order Markov chain-SPA model was used to predict the curative effect. The results showed that the relative errors were fewer than the traditional first-order Markov-SPA model. Conclusions. The present study suggests that a method of SPA combined with higher-order Markov-SPA is relatively effective and can be applied to the clinical prediction of diabetic ulcers, which has higher accuracy than traditional first-order curative effect prediction model.

1. Introduction

Medical decision-making has always been the core and key issue of clinical medicine. The comprehensive decision-making includes not only evaluation of the current symptoms or indicators of patients but also prediction research of future therapeutic effects. At present, there are many methods for medical comprehensive decision-making. Wang et al. [1] evaluated medical quality by a dynamic technique for order performance by similarity to ideal solution. Xu et al. [2] used random forest and information gain algorithm to establish a syndrome classification model that accords with the dialectical theory of TCM. Nevertheless, research on the prediction of curative effect has not been paid enough attention at present.

By the end of 2017, it was estimated that there are 451 million (age: 18–99 years) people with diabetes worldwide. Furthermore, these figures were expected to increase to 693 million by 2045 [3]. Diabetic ulcer is a common serious complication of diabetes and also the main cause of disability in patients [4]. Recently, TCM has become a complementary and alternative medicine worldwide and has been gradually used in the treatment of diabetic ulcers. Our prestudy has reported that Sheng-ji Hua-yu (SJHY) treatment is a sequential therapy method that is efficient in the management of diabetic skin ulcers, making their wound-healing time 2-3 days less than conventional western medicine group [5, 6]. Mechanism of the action might be related to the inhibition of Activin/Follistatin [7].

With respect to curative effect evaluation, Cloud Model-Set Pair Analysis (CM-SPA) is demonstrated to an efficacy assessment for diabetic ulcers with SJHY treatment [8]. On the basis, it is therefore significant to explore a curative effect prediction model. Markov chain is designed to describe dynamic random phenomena that have the discrepancy of time and state. In the prediction of clinical efficacy, a prediction model must be chosen which can handle the transition probability between the states of each treatment time point. What is more, the basic method of Markov chain prediction is to use the transition probability matrix between states to predict the state of events and its development trend [9]. SPA theory is brought up to make a comprehensive analysis of certain and uncertain information. Its core idea is to construct a set pair for two sets associated with uncertain systems to analyze the identity, discrepancy, and contradistinction. Then CD of set pair is defined to quantitatively describe uncertainties caused by ambiguity, randomness, and incomplete information [10]. Clinical efficacy evaluation is an uncertain model caused by individual differences, environmental factors, and other factors, and the uncertainty will convert accordingly with the change of state.

The SPA-Markov method has been used to construct the prediction model of clinical curative effect. This method is composed of SPA and Markov chain that analyze and predict uncertain systems with the characteristics of dynamics, continuity, and randomness. It has been widely used in the fields of aviation safety dynamic assessment [11], information security risk assessment [12], gas pipeline hazard prediction [13], hydropower plant production environmental safety behavior evolution prediction [14], and so on. In addition, Markov model has many developments, including higher-order Markov model [15], multivariate Markov model [16], and hidden Markov chain model [17]. According to the research report, the traditional first-order Markov chain assumes that the next future probability structure is only related to the current state and does not account for its history, consistent with the First-order non-aftereffect. However, in clinical practice, the development of symptoms of patients is in constant metamorphosis that is not completely determined by the recent state but is related to a period of treatment. While the traditional first-order Markov chain has found many applications in prediction model, it abandons long-term useful information when describing random phenomena and is relatively rough in the description of the development and change process of the system that is easy to lead to the distortion of prediction results in practical application. In order to improve the Markov model closer to the real situation and get better prediction results, Raftery [18] firstly proposed the concept of higher-order Markov model to extend the traditional first-order correlation to higher-order correlation, which includes the more preliminary information into forecasts of future variables and the more precise random prediction so that it improves the accuracy of prediction results [19].

In this paper, a SPA model based on higher-order Markov chain was applied to efficacy evaluation and prediction of 15 patients with diabetic ulcers during TCM treatment. According to the following evaluation and prediction process (Figure 1), the SPA method was used to establish the efficacy evaluation model to evaluate the therapeutic effect. Then the higher-order Markov-SPA prediction model was established to predict the future development of curative effect. The predicted results with higher-order Markov chain-SPA and traditional first-order Markov-SPA models were compared with the actual results of the patients to reveal the effectiveness of prediction.

Figure 1 

The process of curative effect evaluation and prediction. The process of curative effect evaluation and prediction was carried out by using the higher-order Markov chain-SPA model.

2. Methods

2.1. SPA

SPA is one of the contact mathematics methods proposed by Zhao and Xuan [10], which deals with uncertain state and trend of the system in many practical problems. “Identity,” “discrepancy,” and “contradistinction” are used to describe their relations to each other and constructed into a certain-uncertain system.

In a given system, two sets A and B with certain relations form a set pair H (A, B). Assuming that the set has N characteristics, where S is the number of features shared in the set pair, is the opposite number of features, and F is the number of uncertain features; S +  + F = N; the CD can be obtained as follows:

Definition 1. represents the degree of “identity,” “discrepancy,” and “contradistinction,” respectively, , i denotes the uncertainty coefficient, , and j is the coefficient of opposites, which is generally defined as −1. Then connection could be expressed asand when n = 3, the CD of the five-element connection number is defined asEach symptom index has a different weight in the evaluation of curative effect; the weight of cloud model (CM) was used [8]. The specific calculation method of the symptom weight was given in the literature [20]. The standardized values of each index were obtained after CM characteristic numbers and the cloud weight calculation. Ex, En, and He are the CM characteristic numbers corresponding to each symptom index k. Ex is the expected value of the cloud drop that can represent the qualitative concept. Then, the weight value of symptom index k is defined as .

Definition 2. Assume that, at time t, the numbers of symptoms in the five levels are A (t), B (t), C (t), D (t), E (t), and A (t) + B (t) + C (t) + D (t) + E (t) = N. The original N symptoms are reordered and numbered sequentially in the order of A (t), B (t), C (t), D (t), E (t). The weight corresponding to the serial number of each symptom is at time t.
According to equation (3), the CD of five-element connection number where symptom weight has been taken into consideration is calculated:where .

Definition 3. The five symptom index levels I to V were given the scores 9, 7, 5, 3, and 1 (Table 1). Afterwards, the efficacy score could be defined asGenerally speaking, when score of curative effect is high, curative effect will be better.

2.2. Higher-Order Markov Chain

Markov chain was first proposed by Russian mathematician A. A. Markov in 1907. The purpose of the method is to describe dynamic random phenomena and it has been applied successfully in many fields of time series analysis and prediction. However, the traditional first-order Markov model only considers that the future probability structure is related to the current state and abandons the older useful information in describing random phenomena which course the process development roughly. In order to make the Markov chain closer to the real situation, Raftery and Tavare [21] first proposed the concept of higher-order Markov chain and pointed out that the traditional first-order correlation can be extended to higher-order correlation. If the time dynamic variable is only related to its previous continuous n states, it has nothing to do with n previous states, so this characterization is called n-order non-aftereffect. In the following series of papers, Raftery proposed the maximum likelihood method of mixed transfer distribution (MTD) model. The parameter estimation of the higher-order Markov model is studied and the transformation of the higher-order Markov model from theoretical results to practical application tools is realized. Based on the research of Raftery, Ching [22] extended the parameter limitation of higher-order Markov chain, deduced a more mature higher-order Markov model that is closer to objective reality, and discussed how to realize its parameter estimation by optimization method in 2004. The higher-order Markov chain method can be used to deal with more complex practical problems through these improvements.

The stochastic process is defined as Markov chain of discrete parameters, the state space , and denotes the probability distribution vector of each state at time t. For a positive integer n, here we have

Then, is an n-order Markov chain, where is a high-order coefficient and . The M-order square matrix Q_r can be considered as r-step state transition probability matrix.

It should be pointed that higher-order Markov chain describes the distribution of state C (t + 1) at time t + 1, which is related to the previous n time states C (t), C (t − 1), and C (t + 1 − n) and ignores the more previous states. The higher-order Markov chain extends the restriction of only adjacent dependence in the first-order Markov chain that makes the model more realistic.

2.3. Higher-Order Markov Chain-SPA Prediction Model

Definition 4. The number of indexes of curative effect level I is A (t) at time t. At time t + 1, there are A (t1) symptoms, the status of which is still level I, A (t2) symptoms change from level I to level II, A (t3) symptoms change from level I to level III, A (t4) symptoms change from level I to level IV, and A (t5) symptoms change from level I to level V. The state transition probability of the symptom index of level I during time [t, t + 1] waswhere ; and .
Similarly, the state transition probabilities of other symptom indicators during time [t, t + 1] are Q_B, Q_C, Q_D, and Q_E, respectively, while the transition probability matrix Q (t + 1) of the system in [t, t + 1] isThe higher-order coefficient λ (t + 1 − r) is equivalent to the weight of the state transition probability matrix Q (t + 1 − r). If the state transition probability matrix Q (t + 1 − r) at time t + 1 − r is more similar to the state transition probability matrix at other times, the contribution of the matrix is smaller and the higher-order coefficient λ (t + 1 − r) is smaller. Therefore, the higher-order coefficient calculation method can be constructed by using matrix similarity [23].

Definition 5. The state transition probability matrices of t + 1 − r and t + 1 − s at any two times are Q (t + 1 − r) and Q (t + 1 − s), respectively. The similarity iswhere <Q (t + 1 − r), Q (t + 1 − s)> = tr (Q (t + 1 − s)^TQ (t + 1 − r)), represents the sum of diagonal elements of a matrix, and reflects the norm derived from the inner product of a matrix, which isθ is the angle between the two matrices. When θ = 90° and Θ = 0, it is indicated that the two matrices are not similar; conversely, if θ = 0° and Θ = 1, the similarity of the two matrices is high. The more similar the state transition probability matrix is, the smaller the higher-order coefficient λ is defined. Therefore, the similarity matrix of the pairwise matrix between the matrices Q (t), Q (t − 1), and Q (t + 1 − n) is shown:According to the similarity matrix Θ, the similarity between the matrix Q (t + 1 − r) and other matrices can be defined asFurthermore, the high-order coefficient is calculated:

Definition 6. The curative effect CD of n moments before time t is defined as follows:CD of curative effect at time t + 1 can be predicted according to equation:where t = 1, 2,…, T; Q (t + 1 − r) is the transition probability matrix at time t + 1 − r; λ (t ≤ 1 − r) is the higher-order coefficient, and .

2.4. Case Analysis

According to the previous clinical observation, ten indexes were identified as the main indicators that affect prognosis of diabetic ulcers [8, 24]. Each course of treatment lasted seven to fourteen days that a total of four treatment time points were observed. Referring to the previous literature of SPA model [25] and Markov model [26], it was found that four examples and two examples were used to verify the applicability of the model, respectively. Therefore, 15 patients were included in this research. Subsequently, the curative effects of 15 patients of diabetic ulcers treated with SJHY method were evaluated and predicted by higher-order Markov chain-SPA and first-order Markov chain-SPA, respectively. Considering the clinical circumstances of amelioration of patients’ symptoms, the results were standardized in case the CD was not equal to 1.

Ten experts were invited to assess the importance of symptom indexes of diabetic ulcers (Table 2); then, the qualitative language variables were transformed into quantitative values by CM. SPA was set as a five-element model that represented five therapeutic levels of asymptomatic (I), lighter (II), moderate (III), heavier (IV), and severe (V), respectively. According to the IWGDF/IDSA classification [27] and referring to literature of diabetic foot ulcers [28], the evaluation of each therapeutic level (Table 3) was determined and the curative effect level (Table 4) of each patient after each course of treatment was obtained. According to the results, the small sample data were compared using the t-test or the Wilcoxon rank-sum test, as appropriate. Two-tailed values < 0.05 were considered statistically significant. All calculations were carried out by SPSS (version 21.0) software package.

3. Results

The value of cloud weight (Table 5) corresponding to each symptom index k was calculated by the cloud model and tested by the confusion degree test, where the confusion value is less than 1. The corresponding image of each symptom was cloud instead of fog (Figure 2) which could be used as the weight of the curative effect index.

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Figure 2 

Cloud images of the index weight. (a–j) The cloud images corresponding to ten symptoms. The confusion value of each symptom is less than 1, which is not “fog,” indicating that the evaluation of symptom weight had practical value.

The CD of 15 patients at each time (Table 6) could be calculated by equation (4) and the curative efficacy score U (Table 7) could be calculated by equation (5). Because the fourth cycle is predicted by the curative effect of the first three cycles, the higher-order coefficient is set as three. The state transition matrix and higher-order coefficient of each treatment course of 15 patients are calculated by equations (7)–(14).

The state transfer matrix of a 68-year male patient (patient a) in each treatment course was defined as follows:

His higher-order coefficients of each treatment course were λt1 = 0.46, λt2 = 0.25, and λt3 = 0.29.

The state transfer matrix of a 66-year female patient (patient b) in each treatment course was shown as follows:

Her higher-order coefficients of each treatment course were λt1 = 0.39, λt2 = 0.24, and λt3 = 0.37.

The state transfer matrix of a 66-year male patient (patient c) in each treatment course was as follows:

His higher-order coefficients of each treatment course were λt1 = 0.46, λt2 = 0.25, and λt3 = 0.29.

The state transfer matrix of a 64-year male patient (patient d) in each treatment course was defined as follows:

His higher-order coefficients of each treatment course were λt1 = 0.44, λt2 = 0.30, and λt3 = 0.26.

The state transfer matrix of a 57-year male patient (patient e) in each treatment course was defined as follows:

His higher-order coefficients of each treatment course were λt1 = 0.39, λt2 = 0.28, and λt3 = 0.33.

The state transfer matrix of a 58-year female patient (patient f) in each treatment course was defined as follows:

Her higher-order coefficients of each treatment course were λt1 = 0.42, λt2 = 0.28, and λt3 = 0.30.

The state transfer matrix of a 66-year male patient (patient g) in each treatment course was defined as follows:

His higher-order coefficients of each treatment course were λt1 = 0.45, λt2 = 0.30, and λt3 = 0.25.

The state transfer matrix of a 50-year male patient (patient h) in each treatment course was defined as follows:

His higher-order coefficients of each treatment course were λt1 = 0.43, λt2 = 0.34, and λt3 = 0.23.

The state transfer matrix of a 68-year male patient (patient i) in each treatment course was defined as follows:

His higher-order coefficients of each treatment course were λt1 = 0.36, λt2 = 0.30, and λt3 = 0.34.

The state transfer matrix of a 61-year female patient (patient j) in each treatment course was defined as follows:

Her higher-order coefficients of each treatment course were λt1 = 0.40, λt2 = 0.29, and λt3 = 0.31.

The state transfer matrix of a 43-year male patient (patient k) in each treatment course was defined as follows: