Transactions of Nanjing University of Aeronautics & Astronautics
×

分享给微信好友或者朋友圈

使用微信“扫一扫”功能。
参考文献 1
ZENGK L . How to think about direct financing and indirect financing[J]. Journal of Financial Research, 1993(10): 7⁃11.
参考文献 2
CHARNESA, COOPERW W, RHODESE . Measuring the efficiency of decision making units[J]. European Journal of Operational Research, 1978, 2(6): 429⁃444.
参考文献 3
WANGY M, CHINK S, YANGJ B . Measuring the performances of decision⁃making units using geometric average efficiency[J]. Journal of the Operational Research Society, 2007, 58(7): 929⁃937.
参考文献 4
WANGY M, CHINK S .A new approach for the selection of advanced manufacturing technologies: DEA with double frontiers[J]. International Journal of Production Research, 2009, 47(23): 6663⁃6679.
参考文献 5
AHMADYN, AZADIM, SADEGHIS A H, et al . A novel fuzzy data envelopment analysis model with double frontiers for supplier selection[J]. International Journal of Logistics Research and Applications, 2013, 16(2): 87‑98.
参考文献 6
SHAERLARA J, AZIZIH, JAHEDR . Fuzzy efficiency measures in DEA: A new approach based on fuzzy DEA approach with double frontiers[J]. International Journal of Applied Operational Research, 2016, 6(1): 1⁃12.
参考文献 7
SENGUPTAJ K . A fuzzy systems approach in data envelopment analysis[J]. Computers and Mathematics with Applications, 1992, 24(8/9): 259⁃266.
参考文献 8
KAO C, LIUS T . Fuzzy efficiency measures in data envelopment analysis[J]. Fuzzy Sets and Systems, 2000,113(3): 427⁃437.
参考文献 9
GUOP, TANAKAH, INUIGUCHIM . Self⁃organizing fuzzy aggregation models to rank the objects with multiple attributes[J]. IEEE Transactions on Systems, Man, and Cybernetics⁃Part A: Systems and Humans, 2000, 30(5): 573⁃580.
参考文献 10
LERTWORASIRIKULS, FANGS C, JOINESJ A, et al . Fuzzy data envelopment analysis (DEA): A possibility approach[J]. Fuzzy Sets and Systems, 2003, 139(2): 379⁃394.
参考文献 11
SEIFORDL M, ZHUJ . Modeling undesirable factors in efficiency evaluation[J]. European Journal of Operation Research, 2002,142(1): 16⁃20.
参考文献 12
JAHANSHAHLOOG R, HOSSEINZADEHL F, SHOJAN, et al . Undesirable inputs and outputs in DEA models[J]. Applied Mathematics and Computation, 2005,113(3): 427⁃437.
参考文献 13
TOLOOM, HANČLOVÁJ . Multi⁃valued measures in DEA in the presence of undesirable outputs[EB/OL]. (2019⁃3⁃20)[2019⁃4⁃12].https://data.mendeley.com/datasets/dhg3jn5y2b/1.
参考文献 14
HAILUA, VEEMANT S . Non⁃parametric productivity analysis with undesirable outputs: An application to the Canadian pulp and paper industry[J]. American Journal of Agricultural Economics, 2001, 83: 605⁃616.
参考文献 15
COOKW D, GREENR H, ZHUJ . Dual⁃role factors in data envelopment analysis[J]. Lie Transactions, 2006, 38(2): 105⁃115.
参考文献 16
AZADIM, MIRHEDAYATIANS M, SAENR F, et al . Green supplier selection: A novel fuzzy double frontier data envelopment analysis model to deal with undesirable outputs and dual⁃role factors[J]. International Journal of Industrial and Systems Engineering, 2017, 25(2): 160‑181.
参考文献 17
WANgQ, GENGC X . Research on financing efficiencies of strategic emerging listed companies by six⁃stage DEA model[J]. Mathematical Problems in Engineering, 2017(1): 1⁃8.
Document Sections

    Abstract

    The energy⁃saving and environmental protection industry has vast development space and huge market increment in China. Selecting appropriate energy‑saving and environmental protection enterprises is one of the important decisions of venture capital investment. In the paper, a fuzzy bilateral boundary data envelopment analysis(DEA) model with optimistic coefficient is proposed to select those companies with high financing efficiencies. Based on the characteristics of enterprise financing, undesirable outputs and dual⁃role factors are considered in the proposed model. The results show that the fifth enterprise has high comprehensive financing efficiencies and always ranks the first when the optimistic coefficients are 0.2, 0.5 and 0.8, respectively. In addition, most energy‑saving and environmental protection enterprises have not efficient financing efficiencies. There is still much space for improvement.

    摘要

    暂无

  • 0 Introduction

    As the direction of a new round of technological revolution and industrial transformation, to accelerate the cultivation and development of strategic emerging industries is not only the general trend of global industrial restructuring but also a major strategic choice for the Chinese government to promote the transformation of economic development mode and upgrade the industrial structure. As one of strategic emerging industries, energy conservation and environmental protection industry in the future plays a more and more important role in the development of the national economy. In 1999, the proportion of investment in environmental protection was firstly above 1% in GDP. The proportion of environmental input to GDP increased from 1.2% during the 10th Five⁃Year Plan to 3.5% during the 12th Five⁃Year Plan. With the supply side reform and enforcement of tighter regulation in China, energy saving and environmental protection industry gradually open the market space. In 2017, the output value of energy conservation and environmental protection industry in China reached 1 trillion and 600 billion yuan. National Development and Reform Commission announced that its industrial scale is expected to double the original capacity to 2020 and become an important pillar industry of the national economy.

    Capital is the core and artery of industry development. Annual capital demand of green industry in China is about 4 trillion yuan. The government, however, can only take out 10%, that is to say, about 90% of green investment funding gap rely on social and private capital. There are the characteristics of capital demand, long recovery period, and slow capital turnover in most energy conservation and environmental protection projects, which result in a lot of difficulties to obtain bank credit funds. Therefore, energy conservation and environmental protection companies are increasingly concerned about financing efficiencies under the limited financial resources supplied. Improving financing efficiencies helps to promote industrial quality and efficiency as well as industrial transformation and upgrading. At the same time, selecting energy saving and environmental protection companies with high financing efficiencies are the best choice for venture capital enterprises.

    In this paper, we employed a fuzzy double⁃frontier data envelopment analysis (DEA) model with undesirable outputs and dual⁃role factors for evaluating financing efficiencies of energy saving and environmental protection companies. This model can present comprehensive fuzzy efficiencies considering both the magnitude and direction of optimistic and pessimistic fuzzy efficiencies calculated by fuzzy operation nature, and then rank them by preference degree and optimistic coefficient. Further, it can provide not only the ranking of these financing efficiencies but also the extent to which any company is superior to another.

  • 1 Literature Review

    Since Zeng first proposed the concept of financing efficiency in 1993[1], many scholars began to research on financing efficiency. There are many methods to evaluate the financing efficiencies of companies. As one of them, DEA, first proposed by Charnes et al. in 1978[2], is a non⁃parametric approach to measure best relative efficiencies of decision⁃making units (DMUs). A decision⁃making unit is considered as effective if its efficiency is equal to unity; otherwise, it is inefficient. The DEA method does not require any assumptions about the shape of the production frontier level and the internal operations of the decision⁃making units. It has been successfully and widely used in various fields, such as health care, energy, finance, education, utilities, etc.

    Conventional DEA measures the best relative efficiencies of all decision making units with respect to the efficiency frontier. These efficiencies are also called optimistic efficiencies. DEA model with double frontiers, first proposed by Wang et al.[3], considers both optimistic efficiencies with respect to efficiency frontier and pessimistic efficiencies with respect to inefficiency frontier. By evaluating only the best efficiency of all decision‑making units, the conventional DEA model cannot provide an overall assessment of them. Futrher, they can be fully ranked if we have optimistic and pessimistic relative efficiencies by double frontiers. Later, in 2009, Wang et al. converted fuzzy DEA models into three linear programming models by fuzzy arithmetic and obtained the fuzzy efficiencies of all decision⁃making units[4]. Ahmady et al. developed fuzzy DEA models with double frontiers[5,6].

    Basic DEA models require crisp inputs and outputs. In the real world, however, the observed values of both inputs and outputs may not always be accurate, especially when DMUs contain missing or judgment data. After Sengupta proposed a fuzzy approach in DEA[7], many fuzzy DEA methods have been developed. The most common method of fuzzy DEA model is the approach of using α ‑level cut set, in which the fuzzy DEA model can be transformed into a pair of mathematical programming to obtain the upper and lower bounds of α ⁃level cut sets of efficiency scores, such as Kao and Liu[8]. Guo et al. firstly proposed fuzzy DEA models by the possibility and necessity measures in 2000[9]. Subsequently, Lertworasirikul et al. presented two ranking methods in fuzzy DEA models with possibility and necessity approach in 2003[10]. In the above mentioned DEA approaches, it is assumed that all the outputs are desirable in efficiency analysis. But there are sometimes undesirable outputs in our real world, such as financing risk. In 2002, Seiford et al. proposed a DEA model with undesirable factors in efficiency evaluation[11]. The undesirable outputs should be decreased to increase efficiency. Jahanshahloo et al. proposed a DEA model with double frontiers in the presence of undesirable outputs in 2005[12]. And Toloo et al. presented individual and summative models in the DEA model with undesirable outputs[13]. More desirable outputs relative fewer inputs are preferred in the DEA model. Undesirable outputs are always accompanied by the increasing desirable outputs in the production process. Therefore, this model considers undesirable outputs as inputs[14].

    Besides undesirable outputs, there might be some variables as both inputs and outputs. These variables are called dual⁃role factors. For instance, to evaluate financing efficiencies, a variable like financing cost, can be considered as both an input and an output. Such a factor is input since it is also part of inputs in the financing process. And it plays a role of outputs because it is accompanied with inputs. Cook et al. proposed a DEA model with dual⁃role factors[15]. Azadi et al. developed a DEA model in the presence of both undesirable outputs and dual⁃role factors to select the best green suppliers[16]. The idea of this model is to convert the fuzzy DEA model to the classical DEA model by fuzzy expected values, which lose some information about the sample.

  • 2 Fuzzy Bilateral Boundary DEA Model

    A new fuzzy DEA model with double frontiers is proposed in this section, which considering both dual⁃role factors and undesirable outputs. To this end, we employ the traditional DEA model, which was proposed by Charnes et al. in 1978 and described as follows[2]

    Maxθ0=r=1suryr0i=1mvixi0s.t.r=1suryrji=1mvixij1j=1,2,,n;ur,vi0,r=1,2,,s;i=1,2,,m
    (1)

    where θ0 denotes the efficiency of DMU0 under investigation; xi0 the ith input of DMU0 , and yr0 the rth output; vi and ur are the weights of input xij and output yrj of DMUj , respectively. DMU0 is considered to be efficient if θ0 =1, and inefficient if θ0<1 . This linear programming is equivalent to the following

    Maxθ0=r=1suryr0s.t.i=1mvixi0=1r=1suryrj-i=1mvixij0j=1,2,,nur,vi0,r=1,2,,s;i=1,2,,m
    (2)

    The efficiency θ0 of DMU0 obtained from Eq.(2) by maximizing in the range of not greater than 1, is the optimistic efficiency relative to the other decision⁃making unit. All optimistic efficient units form an efficient production frontier. If by replacing the maximum to the minimum, the efficiency of any decision⁃making unit is required to be greater than or equal to 1, and then the efficiency is called the worst relative efficiency. It is also called pessimistic efficiency. These pessimistic inefficient efficiencies form an inefficient production frontier. The specific model is as follows

    Minθ0=r=1suryr0s.t.i=1mvixi0=1r=1suryrj-i=1mvixij0j=1,2,,n;ur,vi0;r=1,2,,s;i=1,2,,m
    (3)
  • 2.1 Optimistic fuzzy relative efficiencies

    Suppose that there are n decision⁃making units for assessment, each decision⁃making unit consists of m inputs and s outputs. Let the input and output values of the jth decision⁃making unit be characterized by triangular fuzzy numbers x˜ij=(xijL,xijM,xijU) and y˜ij=(yijL,yijM,yijU) with xijUxijMxijL>0 and yijUyijMyijL>0(i=1,2,,m;j=1,2,,n;r=1,2,,s) , respectively. If xijL=xijM=xijU and yijL=yijM=yijU , x˜ij and y˜rj degenerate into crisp values as a special case of triangular fuzzy data. And the specific description of variables is shown in Table1.

    Table 1 Variable description

    ParameterDescription
    n The number of decision making units
    m The number of inputs of each decision making unit
    s The number of outputs of each decision making unit
    F The number of dual⁃role factors of each decision making unit
    K The number of undesirable outputs of each decision making unit
    x˜ij=(xijL,xijM,xijU) The ith input of the jth decision making unit, which is a triangular fuzzy number
    y˜rj=(yijL,yijM,yijU) The rth output of the jth decision making unit, which is a triangular fuzzy number
    x˜i0=(xi0L,xi0M,xi0U) The ith input of the decision making unit under investigation, which is a triangular fuzzy number
    y˜r0=(yi0L,yi0M,yi0U) The rth output of the decision making unit under investigation, which is a triangular fuzzy number
    ω˜fj=(ωfjL,ωfjM,ωfjU) The fth double⁃role factor of the jth decision making unit as both an input and an output, which is a triangular fuzzy number
    b˜tj=(btjL,btjM,btjU) The tth undesirable output of the jth decision making unit, which is a triangular fuzzy number
    Maxθ0U=r=1suryr0U+f=1Fγfωf0Us.t.i=1mvixi0L+f=1Fβfωf0L+t=1Kηtbt0L=1r=1suryrjU+f=1FγfωfjU-i=1mvixijL-f=1FβfωfjL-t=1KηtbtjL0j=1,2,,n;ur,vi,γf,βf,ηt0;r=1,2,,s;i=1,2,,m;f=1,2,,F;t=1,2,,K
    (4)
    Maxθ0M=r=1suryr0M+f=1Fγfωf0Ms.t.i=1mvixi0M+f=1Fβfωf0M+t=1Kηtbt0M=1r=1suryrjU+f=1FγfωfjU-i=1mvixijL-f=1FβfωfjL-t=1KηtbtjL0j=1,2,,n;ur,vi,γf,βf,ηt0;r=1,2,,s;i=1,2,,m;f=1,2,,F;t=1,2,,K
    (5)
    Maxθ0L=r=1suryr0L+f=1Fγfωf0Ls.t.i=1mvixi0U+f=1Fβfωf0U+t=1Kηtbt0U=1r=1suryrjU+f=1FγfωfjU-i=1mvixijL-f=1FβfωfjL-t=1KηtbtjL0j=1,2,,n;ur,vi,γf,βf,ηt0;r=1,2,,s;i=1,2,,m;f=1,2,,F;t=1,2,,K
    (6)

    The optimistic fuzzy efficiency θ˜0*=(θ0L*,θ0M*,θ0U*) of the decision⁃making unit under investigation consists of optimal values obtained from the above models (4)—(6), almost regarded as a triangular fuzzy number. If θ0U* is equal to 1, the decision⁃making unit under investigation is called optimistic efficient or fuzzy DEA efficient. All these fuzzy DEA efficient decision⁃making units form an efficiency frontier.

  • 2.2 Pessimistic fuzzy relative efficiencies

    In the pessimistic case, the output level is maintained in the current limit, while input values are proportionally increased until reaching the inefficient production frontier. The efficiency for the inefficient production possibility set obtained from DEA model is called the worst relative efficiency or pessimistic efficiency.

    Theorem The pessimistic fuzzy efficiency φ0*=(φ0L*,φ0M*,φ0U*) of DMU0 with dual⁃role factors and undesirable outputs are obtained from the following programming models

    Minφ0U=r=1suryr0U+f=1Fγfωf0Us.t.i=1mvixi0L+f=1Fβfωf0L+t=1Kηtbt0L=1r=1suryrjL+f=1FγfωfjL-i=1mvixijU-f=1FβfωfjU-t=1KηtbtjU0j=1,2,,n;ur,vi,γf,βf,ηt0;r=1,2,,s;i=1,2,,m;f=1,2,,F;t=1,2,,K
    (7)
    Minφ0M=r=1suryr0M+f=1Fγfωf0Ms.t.i=1mvixi0M+f=1Fβfωf0M+t=1Kηtbt0M=1r=1suryrjL+f=1FγfωfjL-i=1mvixijU-f=1FβfωfjU-t=1KηtbtjU0j=1,2,,n;ur,vi,γf,βf,ηt0;r=1,2,,s;i=1,2,,m;f=1,2,,F;t=1,2,,K
    (8)
    Minφ0L=r=1suryr0L+f=1Fγfωf0Ls.t.i=1mvixi0U+f=1Fβfωf0U+t=1Kηtbt0U=1r=1suryrjL+f=1FγfωfjL-i=1mvixijU-f=1FβfωfjU-t=1KηtbtjU0j=1,2,,n;ur,vi,γf,βf,ηt0,r=1,2,,s;i=1,2,,m;f=1,2,,F;t=1,2,,K
    (9)

    The pessimistic fuzzy inefficiency φ˜0*=(φ0L*,φ0M*,φ0U*) of the decision⁃making unit under investigation consists of three optimal values obtained from Eqs.(7) —(9), which can be almost regarded as a triangular fuzzy number. If φ0L*=1 , this decision‑making unit under investigation is called pessimistic inefficient or fuzzy DEA inefficient. All these fuzzy DEA inefficient decision⁃making units form an inefficiency frontier.

  • 2.3 Comprehensive fuzzy efficiencies with bilateral boundary

    From two different perspectives, we can obtain optimistic and pessimistic fuzzy efficiencies. Then there are two different rankings for each decision⁃making unit. Naturally, we need a comprehensive performance measure for each DMU. Here, we propose the following measure based on Wang et al.[4] for evaluating all decision⁃making units rather than other means

    η˜j=2αθ˜j*i=1nθ˜i*2+2(1-α)φ˜j*i=1nφ˜i*2=(2αθjL*,2αθjM*,2αθjU*)i=1nθjL*2,i=1nθjM*2,i=1nθjU*2+(2(1-α)φjL*,2(1-α)φjM*,2(1-α)φjU*)(i=1nφjL*2,i=1nφjM*2,i=1nφjU*2)j=1,2,,n
    (10)

    where θ˜j* and φ˜j* are optimistic and pessimistic fuzzy efficiencies and the optimistic coefficient α[0,1] , respectively. Its advantage lies in considering not only magnitudes but also directions of two fuzzy efficiencies. For convenience, it can be approximated as follows by the operational rules of triangular fuzzy numbers

    η˜j=2αθjL*i=1nθiU*2+2(1-α)φjL*i=1nφiU*2,2αθjM*i=1nθiM*2+2(1-α)φjM*i=1nφiM*2,2αθjU*i=1nθiL*2+2(1-α)φjU*i=1nφiL*2
    (11)

    The optimistic fuzzy efficient decision⁃making units on the efficiency frontier have good performance relative to other decision‑making units, while those on the inefficiency frontier have relatively poor performance. The best decision⁃making units can usually be derived from the optimistic fuzzy efficient decision‑making units. Since the comprehensive fuzzy efficiency η˜j=(ηjL,ηjM,ηjU) is a triangular fuzzy number, we can compare and rank all comprehensive fuzzy efficiencies with the degree of preference approach in the next section.

  • 2.4 Ranking methods of fuzzy triangular efficiencies

    There are many methods in the current literature for ranking fuzzy numbers. In this paper, a preference degree will be introduced for ranking fuzzy triangular efficiencies of decision‑making units.

    Suppose η˜1=(η1L,η1M,η1U) and η˜2=(η2L,η2M,η2U) be two triangular fuzzy efficiencies. The preference degrees η˜1>η˜2 are defined as the follows[3]

    pη˜1>η˜2=1η1Lη2U0η1Uη2L(η1U-η2L)2(η1U-η1M+η2M-η2L)(η1U-η1L+η2U-η2L)η1U>η2Landη1Mη2M1-(η2U-η1L)2(η1M-η1L+η2U-η2M)(η1U-η1L+η2U-η2L)η1M>η2Mandη1L<η2U
    (12)

    We can calculate the preference degree for any two decision⁃making units, which constitute the matrix of preference degree. If we find the jth row of this matrix with all elements being not less than 0.5, the fuzzy efficiency η˜j is the highest. After eliminating the jth row and column of preference degree matrix, searching for the biggest efficiency is repeated until all triangular fuzzy efficiencies are fully ranked.

  • 3 Selection of Energy Saving and Environmental Protection Enterprises

  • 3.1 Data resource

    In this section, we applied the proposed model to 19 listed enterprises of energy conservation and environmental protection industry in China. The financing sources of enterprises are debt financing and equity financing. Accordingly, the inputs include debt financing and equity financing[17]. The amount of debt financing is indicated by the sum of short⁃term loans, the bond payable and long⁃term loans. And the amount of equity financing is indicated by the sum of paid⁃in capital, capital reserve, surplus reserve, and undistributed profit. The amount financed is not a one⁃off gain at the beginning of the year, thus these inputs are considered as triangular fuzzy numbers according to their financing amount at the beginning, middle and end of the year. Financing cost can be regarded as the output of financing capital and the input of the operation with financing capital. Then indicated by the sum of dividends and interest payable, the financing cost is selected as a dual⁃role factor in the form of a triangular fuzzy number. The final performance on financing efficiency of enterprises includes the market performance and management level. The net profit and prime operating revenue are considered as desirable outputs, in which prime operating revenue is regarded as a triangular fuzzy number due to the uncertain environment and time. The equity ratio is a major factor that affects the financial risk of enterprises. Indicated by equity ratio, financing risk is the only undesirable output and also regarded as a triangular fuzzy number due to the uncertain environment. The related data are derived from the financial statements of listed companies in the CSMAR database, as shown in Table2.

    Table 2 Sample dataset of energy saving and environmental protection companies

    DMUInputDual⁃role factorDesirable outputUndesirable output
    Debt financingEquity financingFinancing costNet profitPrime operating revenueFinancing risk
    x˜1j x˜2j ω˜1j y1j y˜2j b˜1j
    1(5 590,5 609,7 437)(16 480,16 800,17 711)(133,203,367)2 336(11 838,12 080,12 506)(0.77,0.89,0.90)
    2(354,575,1 079)(1 923,2 047,2 057)(2,3,4)290(6 020,6 895,7 003)(1.45,1.56,1.60)
    3(369,460,475)(9 600,10 090,10 858)(0.75,1.33,2.49)1 589(5 012,5 936,6 354)(0.29,0.31,0.36)
    4(1 097,1 154,1 988)(6 771,7 091,7 449)(16,41,104)761(2 013,2 685,2 724)(0.48,0.53,0.62)
    5(4 692,5 838,7 368)(34 538,35 742,44 016)(16,37,52)14 253(109 137,120 932,139 295)(2.46,2.55,2.77)
    6(8 104,10 267,10 298)(2 031,2 117,2 363)(65,100,126)603(4 308,5 639,6 444)(5.63, 5.80,6.63)
    7(2,10,12)(120,519,529)(10,10,11)18(316,386,405)(0.74,0.78,3.30)
    8(3 035,3 608,3 785)(1 286,1 315,1 382)(7,11,20)102(5 114,5 798,6 168)(3.53, 3.96,4.05)
    9(8 431,12 151,12 718)(5 757,5 970,6 247)(109,146,343)688(5 041,5 409,5 589)(1.47,1.83,2.23)
    10(7,7,7)(9 888,10 033,10 820)(1,1,1)1 443(27 592,28 305,29 007)(0.86,0.89,0.95)
    11(1 749,1 974,2 090)(3 849,4 015,4 137)(40,48,79)325(972,1 035,1 178)(0.65,0.74, 0.79)
    12(1 767,2 059,3 365)(2 443,2 524,3 301)(29,38,74)352(1 906,2 094,2 435)(1.19,1.28,1.98)
    13(370,504,644)(1 685,1 703,1 746)(2,2,2)91(5 937,6 590,6 881)(0.36,0.46,0.57)
    14(1 954,1 970,2 006)(1 743,1 774,1 852)(22,23,30)152(1 237,1 306,1 448)(1.57,1.60,1.65)
    15(384,706,759)(1 300,1 310,1 334)(25,25,27)57(1 907,2 058,2 783)(1.66,2.45,2.54)
    16(9 209,11 038,12 095)(14 267,14 272,16 679)(126,172,649)1 991(3 847,4 618,4 931)(1.24,1.44,1.44)
    17(706,786,920)(1 737,1 916,2 061)(12,14,38)320(2 013,2 197,2 257)(0.60,0.68,0.69)
    18(2 598,2 791,3 004)(3 976,4 006,4 170)(60,91,151)318(1 624,1 759,1 828)(1.50,1.68,1.73)
    19(1 728,2 194,2 839)(4 304,4 362,4 604)(46,49,66)56(22 017,22 746,22 865)(4.15,4.36, 4.58)
  • 3.2 Results

    By solving the models (4)—(9) for the jth decision⁃making unit ( j=1,2,,n ), we can obtain its optimistic fuzzy efficiency θ˜j* and pessimistic fuzzy efficiency φ˜j* , as shown in Table3. According to Table3, 11 companies with efficiencies θjU*=1 are optimistic fuzzy efficient or DEA efficient. And other companies with efficiencies θjU*<1 are not optimistic efficient. These optimistic fuzzy efficient companies together form an efficiency frontier. The minimum of all upper bounds θjU* is only 0.424 7 and that of all lower bounds θjL* is 0.271 1. The optimistic fuzzy efficiency of DMU10 is equal to unity, which means it is DEA efficient.

    Table 3 Fuzzy financing efficiencies for 19 companies

    DMUOptimistic efficiencyPessimistic efficiencyComprehensive efficiency
    α=0.2 α=0.5 α=0.8
    1(0.590,0.680,1.000)(1.386,1.684,2.030)(0.379,0.532,0.838)(0.349,0.492,0.788)(0.319,0.452,0.738)
    2(0.690,0.808,0.887)(1.000,1.197,1.456)(0.301,0.419,0.625)(0.319,0.533,0.625)(0.338,0.484,0.625)
    3(0.814,0.918,1.000)(1.000,1.089,1.168)(0.313,0.404,0.542)(0.351,0.468,0.603)(0.388,0.532,0.664)
    4(0.271,0.506,1.000)(1.000,1.164 3,1.494)(0.258,0.373 0.654)(0.213,0.352,0.673)(0.168,0.331,0.692)
    5(0.888,0.966,1.000)(1.115,2.922,3.363)(0.347,0.897,1.296)(0.386,0.788,1.074)(0.425,0.678,0.852)
    6(0.741,0.903,1.000)(1.000,1.081,1.392)(0.306,0.400,0.619)(0.332,0.462,0.651)(0.358,0.524,0.683)
    7(0.777,0.860,1.000)(1.000,1.035,1.113)(0.309,0.383,0.523)(0.341,0.441,0.591)(0.373,0.499,0.659)
    8(0.828,0.902,1.000)(1.000,1.046,1.206)(0.314,0.391,0.555)(0.354,0.456,0.611)(0.394,0.521,0.667)
    9(0.458,0.558,1.000)(1.000,1.051,1.321)(0.277,0.349,0.595)(0.260,0.349,0.636)(0.243,0.349,0.677)
    10(1.000,1.000,1.000)(1.000,1.057,1.087)(0.332,0.406,0.514)(0.398,0.489,0.586)(0.464,0.571,0.657)
    11(0.321,0.363,0.598)(1.000,1.048,1.136)(0.263,0.324,0.474)(0.225,0.287,0.454)(0.188,0.251,0.434)
    12(0.335,0.494,0.740)(1.003,1.629,2.018)(0.265,0.494,0.797)(0.229,0.425,0.694)(0.194,0.356,0.591)
    13(0.880,0.951,0.989)(1.000,1.023,1.033)(0.320,0.391,0.494)(0.367,0.468,0.570)(0.415,0.544,0.646)
    14(0.315,0.347,0.425)(1.000,1.047,1.117)(0.262,0.322,0.443)(0.224,0.282,0.389)(0.186,0.243,0.335)
    15(0.507,0.546,0.673)(1.063,1.141,1.303)(0.296,0.371,0.542)(0.282,0.360,0.517)(0.2670,0.349,0.491)
    16(0.391,0.498,1.000)(1.000,1.130,1.329)(0.270,0.362,0.597)(0.243,0.344,0.638)(0.216,0.325,0.678)
    17(0.428,0.475,0.780)(1.555,1.808,2.446)(0.402,0.539,0.950)(0.333,0.449,0.800)(0.263,0.358,0.649)
    18(0.363,0.493,0.795)(1.000,1.071,1.111)(0.267,0.346,0.494)(0.236,0.332,0.518)(0.205,0.318,0.543)
    19(0.921,0.982,1.000)(1.000,1.054,1.070)(0.324,0.403,0.508)(0.378,0.482,0.582)(0.431,0.562,0.656)

    However, from the pessimistic perspective, 14 companies with efficiencies φjL*=1 are pessimistic fuzzy inefficient and DEA inefficient. Then these companies form an inefficiency frontier. Other companies with φjL*>1 are fuzzy pessimistic non⁃inefficient. Therefore, optimistic and pessimistic fuzzy efficiencies are the extreme cases of financing efficiencies and have two different relative efficiency frontiers. The financing performances of all companies are between these two frontiers. We can easily see that some companies are on both frontiers. Therefore, it is necessary to consider the bilateral boundary method to evaluate the financing performance of companies.

    To provide a full ranking for these companies from different perspectives, Table4shows preference degree and their rankings for optimistic, pessimistic and different comprehensive fuzzy efficiencies. In Table4, these companies are fully ranked from the optimistic perspective as 10100%19100%560%1368%352%860%654%782%264%167%958%1654%451%1558%1751%1855%1274%1177%14 . For example, 264%1 means that the former performs better than the latter to the extent of 64%. But they have ranked from the pessimistic perspective as 577%1775%165%1299%251%462%1555%1652%659%959%354%858%1853%1154%1453%1053%753%1983%13 . In Table3, it can easily see that DMU1 is optimistic efficient and not pessimistic inefficient, while DMU2 is just the opposite. Moreover, DMU2 has better performance than DMU1 according to optimistic fuzzy efficiencies, while it is opposite in the pessimistic case. Obviously, there is an inconsistency between the two rankings for these companies. It is due to considering only one perspective, such as the best or the worst situation. The results obtained by using different models are usually not the same. It explains that the evaluation ranking considering only one perspective may be unilateral, impractical and non⁃persuasive.

    Table 4 Preference degrees and rankings for 19 companies

    RankOptimistic efficiency ( θjL* , θjM* , θjU* )Pessimistic efficiency ( φjL* , φjM* , φjU* )Comprehensive efficiency ( ηjL , ηjM , ηjU )
    α=0.2 α=0.5 α=0.8
    DMUPreference/%DMUPreference/%DMUPreference/%DMUPreference/%DMUPreference/%
    110100577575579574
    219100177517571551056
    356016516117561956
    413681299126810551353
    53522512531951351
    6860462656652851
    76541555350351654
    87821652451851756
    926465910511351152
    10167959852253267
    1195835419557531751
    1216548587501259954
    13451185316509501651
    14155811541351451452
    1517511453155116541253
    161855105396115591556
    171274753185718651870
    1811771983115511601165
    1914-13-14-14-14-

    In order to take both frontiers into account, the solution is to consider both the magnitude and the direction of optimistic and pessimistic fuzzy efficiencies. Therefore, we need to introduce an optimistic coefficient α to get different comprehensive fuzzy financing efficiencies calculated by models (11)—(12). Specific comprehensive fuzzy efficiencies with α=0.2 , 0.5 and 0.8 are shown in the right columns of Table3. We can see that these fuzzy efficiencies are very low and the minimum of all upper bounds is 0.335. But the upper bounds of η5U with α=0.2 and 0.5 is greater than 1.

    The rankings and preference degrees with different optimistic coefficient are shown in the right columns of Table4. The results show the financing performance and rankings of companies from different perspectives. From the optimistic perspective, the 10th company has the best performance. But the 5th company has the best performance from the pessimistic perspective and with optimistic coefficient α=0.2,0.5 and 0.8. Moreover, we also know the preference degrees. For example, when α=0.2 , the comprehensive financing performance of DMU5 is 75% more than that of DMU17.

  • 4 Conclusions

    The whole process of enterprises’ business financing is full of uncertainty, including financing cost and risk, etc. In recent years, environmental protection finance has a great impact on energy saving and environmental protection industries. Competition between environmental protection enterprises has intensified and gradually evolved into competition and cooperation between these enterprises and financial institutions. Therefore, high financing efficiencies have become a new competitive factor for energy saving and environmental protection enterprises. To select an energy saving and environmental protection enterprise with high financing efficiencies as investment targets, we employed the fuzzy double⁃frontier DEA model to evaluate and rank the financing efficiencies of enterprises in this paper. We took into account the fuzzy DEA approach with double frontiers combined with fuzzy arithmetic and preference degree. It avoids loss information when transforming fuzzy programming into classical mathematical programming.

    Relative to the optimistic efficiency frontier, financing efficiencies of some companies are efficient, but not efficient relative to the pessimistic efficiency frontier. This model considers not only the magnitude but also the direction of optimistic and pessimistic fuzzy efficiencies of all decision‑making units. Moreover, it introduced an optimistic coefficient to obtain different comprehensive fuzzy financing efficiencies. And it can provide the full ranking of all enterprises as well as the priority information calculated by preference degree and optimistic coefficients. It also offers a new perspective for the evaluation of other performance.

  • References

    • 1

      ZENG K L . How to think about direct financing and indirect financing[J]. Journal of Financial Research, 1993(10): 7⁃11.

    • 2

      CHARNES A, COOPER W W, RHODES E . Measuring the efficiency of decision making units[J]. European Journal of Operational Research, 1978, 2(6): 429⁃444.

    • 3

      WANG Y M, CHIN K S, YANG J B . Measuring the performances of decision⁃making units using geometric average efficiency[J]. Journal of the Operational Research Society, 2007, 58(7): 929⁃937.

    • 4

      WANG Y M, CHIN K S .A new approach for the selection of advanced manufacturing technologies: DEA with double frontiers[J]. International Journal of Production Research, 2009, 47(23): 6663⁃6679.

    • 5

      AHMADY N, AZADI M, SADEGHI S A H, et al . A novel fuzzy data envelopment analysis model with double frontiers for supplier selection[J]. International Journal of Logistics Research and Applications, 2013, 16(2): 87‑98.

    • 6

      SHAERLAR A J, AZIZI H, JAHED R . Fuzzy efficiency measures in DEA: A new approach based on fuzzy DEA approach with double frontiers[J]. International Journal of Applied Operational Research, 2016, 6(1): 1⁃12.

    • 7

      SENGUPTA J K . A fuzzy systems approach in data envelopment analysis[J]. Computers and Mathematics with Applications, 1992, 24(8/9): 259⁃266.

    • 8

      KAO C, LIU S T . Fuzzy efficiency measures in data envelopment analysis[J]. Fuzzy Sets and Systems, 2000,113(3): 427⁃437.

    • 9

      GUO P, TANAKA H, INUIGUCHI M . Self⁃organizing fuzzy aggregation models to rank the objects with multiple attributes[J]. IEEE Transactions on Systems, Man, and Cybernetics⁃Part A: Systems and Humans, 2000, 30(5): 573⁃580.

    • 10

      LERTWORASIRIKUL S, FANG S C, JOINES J A, et al . Fuzzy data envelopment analysis (DEA): A possibility approach[J]. Fuzzy Sets and Systems, 2003, 139(2): 379⁃394.

    • 11

      SEIFORD L M, ZHU J . Modeling undesirable factors in efficiency evaluation[J]. European Journal of Operation Research, 2002,142(1): 16⁃20.

    • 12

      JAHANSHAHLOO G R, HOSSEINZADEH L F, SHOJA N, et al . Undesirable inputs and outputs in DEA models[J]. Applied Mathematics and Computation, 2005,113(3): 427⁃437.

    • 13

      TOLOO M, HANČLOVÁ J . Multi⁃valued measures in DEA in the presence of undesirable outputs[EB/OL]. (2019⁃3⁃20)[2019⁃4⁃12].https://data.mendeley.com/datasets/dhg3jn5y2b/1.

    • 14

      HAILU A, VEEMAN T S . Non⁃parametric productivity analysis with undesirable outputs: An application to the Canadian pulp and paper industry[J]. American Journal of Agricultural Economics, 2001, 83: 605⁃616.

    • 15

      COOK W D, GREEN R H, ZHU J . Dual⁃role factors in data envelopment analysis[J]. Lie Transactions, 2006, 38(2): 105⁃115.

    • 16

      AZADI M, MIRHEDAYATIAN S M, SAEN R F, et al . Green supplier selection: A novel fuzzy double frontier data envelopment analysis model to deal with undesirable outputs and dual⁃role factors[J]. International Journal of Industrial and Systems Engineering, 2017, 25(2): 160‑181.

    • 17

      WANg Q, GENG C X . Research on financing efficiencies of strategic emerging listed companies by six⁃stage DEA model[J]. Mathematical Problems in Engineering, 2017(1): 1⁃8.

  • Author contributions & Acknowledgements

    Prof. GENG Chengxuan and Ms. WANG Qiong conceived the idea of this paper. Ms. WANG Qiong conducted data analysis and wrote the manuscript with the help of Prof. GENG Chengxuan. Prof. E Haitao contributed to the discussion and background for the study.

    Acknowledgements:This work was supported by the National Social Science Foundation of China (No.15BGL056) and the Fundamental Research Funds for Central Universities (No.NW2019002). Plus, we are grateful for the anonymous referees for their careful evaluation and critical comments, which greatly improved the quality of this paper.

    Competing Interests

    The authors declare no competing interests.

GENGChengxuan

Affiliation: College of Economics and Management, Nanjing University of Aeronautics and Astronautics, Nanjing 211106, P.R. China

Profile:Prof.GENG Chengxuanreceived her Ph.D. degree in Management from Nanjing University of Aeronautics and Astronautics, Jiangsu, China. She is currently a professor at the College of Economics and Management, NUAA. And she is a doctoral supervisor, director of the Institute of Finance and Accounting, and an academic leader in accounting in Nanjing University of Aeronautics and Astronautics. Her research focuses on financial management and corporate financing.Ms

WANGQiong

Affiliation:

1. College of Economics and Management, Nanjing University of Aeronautics and Astronautics, Nanjing 211106, P.R. China

2. Aliyun School of Big Data, Changzhou University, Changzhou 213164, P.R. China

Role:Corresponding author

Email:wangqiong@cczu.edu.cn.

Profile:E⁃mail address: wangqiong@cczu.edu.cn.

EHaitao

Affiliation: College of Economics and Management, Nanjing University of Aeronautics and Astronautics, Nanjing 211106, P.R. China

Profile: E Haitaograduated from Radio Engineering of Beijing Broadcasting Institute in 1984. He is currently a senior engineer at the Propaganda Department, NUAA. His research focuses on performance evaluation.

Zhang Bei

Role:Editor

ParameterDescription
n The number of decision making units
m The number of inputs of each decision making unit
s The number of outputs of each decision making unit
F The number of dual⁃role factors of each decision making unit
K The number of undesirable outputs of each decision making unit
x˜ij=(xijL,xijM,xijU) The ith input of the jth decision making unit, which is a triangular fuzzy number
y˜rj=(yijL,yijM,yijU) The rth output of the jth decision making unit, which is a triangular fuzzy number
x˜i0=(xi0L,xi0M,xi0U) The ith input of the decision making unit under investigation, which is a triangular fuzzy number
y˜r0=(yi0L,yi0M,yi0U) The rth output of the decision making unit under investigation, which is a triangular fuzzy number
ω˜fj=(ωfjL,ωfjM,ωfjU) The fth double⁃role factor of the jth decision making unit as both an input and an output, which is a triangular fuzzy number
b˜tj=(btjL,btjM,btjU) The tth undesirable output of the jth decision making unit, which is a triangular fuzzy number
DMUInputDual⁃role factorDesirable outputUndesirable output
Debt financingEquity financingFinancing costNet profitPrime operating revenueFinancing risk
x˜1j x˜2j ω˜1j y1j y˜2j b˜1j
1(5 590,5 609,7 437)(16 480,16 800,17 711)(133,203,367)2 336(11 838,12 080,12 506)(0.77,0.89,0.90)
2(354,575,1 079)(1 923,2 047,2 057)(2,3,4)290(6 020,6 895,7 003)(1.45,1.56,1.60)
3(369,460,475)(9 600,10 090,10 858)(0.75,1.33,2.49)1 589(5 012,5 936,6 354)(0.29,0.31,0.36)
4(1 097,1 154,1 988)(6 771,7 091,7 449)(16,41,104)761(2 013,2 685,2 724)(0.48,0.53,0.62)
5(4 692,5 838,7 368)(34 538,35 742,44 016)(16,37,52)14 253(109 137,120 932,139 295)(2.46,2.55,2.77)
6(8 104,10 267,10 298)(2 031,2 117,2 363)(65,100,126)603(4 308,5 639,6 444)(5.63, 5.80,6.63)
7(2,10,12)(120,519,529)(10,10,11)18(316,386,405)(0.74,0.78,3.30)
8(3 035,3 608,3 785)(1 286,1 315,1 382)(7,11,20)102(5 114,5 798,6 168)(3.53, 3.96,4.05)
9(8 431,12 151,12 718)(5 757,5 970,6 247)(109,146,343)688(5 041,5 409,5 589)(1.47,1.83,2.23)
10(7,7,7)(9 888,10 033,10 820)(1,1,1)1 443(27 592,28 305,29 007)(0.86,0.89,0.95)
11(1 749,1 974,2 090)(3 849,4 015,4 137)(40,48,79)325(972,1 035,1 178)(0.65,0.74, 0.79)
12(1 767,2 059,3 365)(2 443,2 524,3 301)(29,38,74)352(1 906,2 094,2 435)(1.19,1.28,1.98)
13(370,504,644)(1 685,1 703,1 746)(2,2,2)91(5 937,6 590,6 881)(0.36,0.46,0.57)
14(1 954,1 970,2 006)(1 743,1 774,1 852)(22,23,30)152(1 237,1 306,1 448)(1.57,1.60,1.65)
15(384,706,759)(1 300,1 310,1 334)(25,25,27)57(1 907,2 058,2 783)(1.66,2.45,2.54)
16(9 209,11 038,12 095)(14 267,14 272,16 679)(126,172,649)1 991(3 847,4 618,4 931)(1.24,1.44,1.44)
17(706,786,920)(1 737,1 916,2 061)(12,14,38)320(2 013,2 197,2 257)(0.60,0.68,0.69)
18(2 598,2 791,3 004)(3 976,4 006,4 170)(60,91,151)318(1 624,1 759,1 828)(1.50,1.68,1.73)
19(1 728,2 194,2 839)(4 304,4 362,4 604)(46,49,66)56(22 017,22 746,22 865)(4.15,4.36, 4.58)
DMUOptimistic efficiencyPessimistic efficiencyComprehensive efficiency
α=0.2 α=0.5 α=0.8
1(0.590,0.680,1.000)(1.386,1.684,2.030)(0.379,0.532,0.838)(0.349,0.492,0.788)(0.319,0.452,0.738)
2(0.690,0.808,0.887)(1.000,1.197,1.456)(0.301,0.419,0.625)(0.319,0.533,0.625)(0.338,0.484,0.625)
3(0.814,0.918,1.000)(1.000,1.089,1.168)(0.313,0.404,0.542)(0.351,0.468,0.603)(0.388,0.532,0.664)
4(0.271,0.506,1.000)(1.000,1.164 3,1.494)(0.258,0.373 0.654)(0.213,0.352,0.673)(0.168,0.331,0.692)
5(0.888,0.966,1.000)(1.115,2.922,3.363)(0.347,0.897,1.296)(0.386,0.788,1.074)(0.425,0.678,0.852)
6(0.741,0.903,1.000)(1.000,1.081,1.392)(0.306,0.400,0.619)(0.332,0.462,0.651)(0.358,0.524,0.683)
7(0.777,0.860,1.000)(1.000,1.035,1.113)(0.309,0.383,0.523)(0.341,0.441,0.591)(0.373,0.499,0.659)
8(0.828,0.902,1.000)(1.000,1.046,1.206)(0.314,0.391,0.555)(0.354,0.456,0.611)(0.394,0.521,0.667)
9(0.458,0.558,1.000)(1.000,1.051,1.321)(0.277,0.349,0.595)(0.260,0.349,0.636)(0.243,0.349,0.677)
10(1.000,1.000,1.000)(1.000,1.057,1.087)(0.332,0.406,0.514)(0.398,0.489,0.586)(0.464,0.571,0.657)
11(0.321,0.363,0.598)(1.000,1.048,1.136)(0.263,0.324,0.474)(0.225,0.287,0.454)(0.188,0.251,0.434)
12(0.335,0.494,0.740)(1.003,1.629,2.018)(0.265,0.494,0.797)(0.229,0.425,0.694)(0.194,0.356,0.591)
13(0.880,0.951,0.989)(1.000,1.023,1.033)(0.320,0.391,0.494)(0.367,0.468,0.570)(0.415,0.544,0.646)
14(0.315,0.347,0.425)(1.000,1.047,1.117)(0.262,0.322,0.443)(0.224,0.282,0.389)(0.186,0.243,0.335)
15(0.507,0.546,0.673)(1.063,1.141,1.303)(0.296,0.371,0.542)(0.282,0.360,0.517)(0.2670,0.349,0.491)
16(0.391,0.498,1.000)(1.000,1.130,1.329)(0.270,0.362,0.597)(0.243,0.344,0.638)(0.216,0.325,0.678)
17(0.428,0.475,0.780)(1.555,1.808,2.446)(0.402,0.539,0.950)(0.333,0.449,0.800)(0.263,0.358,0.649)
18(0.363,0.493,0.795)(1.000,1.071,1.111)(0.267,0.346,0.494)(0.236,0.332,0.518)(0.205,0.318,0.543)
19(0.921,0.982,1.000)(1.000,1.054,1.070)(0.324,0.403,0.508)(0.378,0.482,0.582)(0.431,0.562,0.656)
RankOptimistic efficiency ( θjL* , θjM* , θjU* )Pessimistic efficiency ( φjL* , φjM* , φjU* )Comprehensive efficiency ( ηjL , ηjM , ηjU )
α=0.2 α=0.5 α=0.8
DMUPreference/%DMUPreference/%DMUPreference/%DMUPreference/%DMUPreference/%
110100577575579574
219100177517571551056
356016516117561956
413681299126810551353
53522512531951351
6860462656652851
76541555350351654
87821652451851756
926465910511351152
10167959852253267
1195835419557531751
1216548587501259954
13451185316509501651
14155811541351451452
1517511453155116541253
161855105396115591556
171274753185718651870
1811771983115511601165
1914-13-14-14-14-

Table 1 Variable description

Table 2 Sample dataset of energy saving and environmental protection companies

Table 3 Fuzzy financing efficiencies for 19 companies

Table 4 Preference degrees and rankings for 19 companies

image /

  • References

    • 1

      ZENG K L . How to think about direct financing and indirect financing[J]. Journal of Financial Research, 1993(10): 7⁃11.

    • 2

      CHARNES A, COOPER W W, RHODES E . Measuring the efficiency of decision making units[J]. European Journal of Operational Research, 1978, 2(6): 429⁃444.

    • 3

      WANG Y M, CHIN K S, YANG J B . Measuring the performances of decision⁃making units using geometric average efficiency[J]. Journal of the Operational Research Society, 2007, 58(7): 929⁃937.

    • 4

      WANG Y M, CHIN K S .A new approach for the selection of advanced manufacturing technologies: DEA with double frontiers[J]. International Journal of Production Research, 2009, 47(23): 6663⁃6679.

    • 5

      AHMADY N, AZADI M, SADEGHI S A H, et al . A novel fuzzy data envelopment analysis model with double frontiers for supplier selection[J]. International Journal of Logistics Research and Applications, 2013, 16(2): 87‑98.

    • 6

      SHAERLAR A J, AZIZI H, JAHED R . Fuzzy efficiency measures in DEA: A new approach based on fuzzy DEA approach with double frontiers[J]. International Journal of Applied Operational Research, 2016, 6(1): 1⁃12.

    • 7

      SENGUPTA J K . A fuzzy systems approach in data envelopment analysis[J]. Computers and Mathematics with Applications, 1992, 24(8/9): 259⁃266.

    • 8

      KAO C, LIU S T . Fuzzy efficiency measures in data envelopment analysis[J]. Fuzzy Sets and Systems, 2000,113(3): 427⁃437.

    • 9

      GUO P, TANAKA H, INUIGUCHI M . Self⁃organizing fuzzy aggregation models to rank the objects with multiple attributes[J]. IEEE Transactions on Systems, Man, and Cybernetics⁃Part A: Systems and Humans, 2000, 30(5): 573⁃580.

    • 10

      LERTWORASIRIKUL S, FANG S C, JOINES J A, et al . Fuzzy data envelopment analysis (DEA): A possibility approach[J]. Fuzzy Sets and Systems, 2003, 139(2): 379⁃394.

    • 11

      SEIFORD L M, ZHU J . Modeling undesirable factors in efficiency evaluation[J]. European Journal of Operation Research, 2002,142(1): 16⁃20.

    • 12

      JAHANSHAHLOO G R, HOSSEINZADEH L F, SHOJA N, et al . Undesirable inputs and outputs in DEA models[J]. Applied Mathematics and Computation, 2005,113(3): 427⁃437.

    • 13

      TOLOO M, HANČLOVÁ J . Multi⁃valued measures in DEA in the presence of undesirable outputs[EB/OL]. (2019⁃3⁃20)[2019⁃4⁃12].https://data.mendeley.com/datasets/dhg3jn5y2b/1.

    • 14

      HAILU A, VEEMAN T S . Non⁃parametric productivity analysis with undesirable outputs: An application to the Canadian pulp and paper industry[J]. American Journal of Agricultural Economics, 2001, 83: 605⁃616.

    • 15

      COOK W D, GREEN R H, ZHU J . Dual⁃role factors in data envelopment analysis[J]. Lie Transactions, 2006, 38(2): 105⁃115.

    • 16

      AZADI M, MIRHEDAYATIAN S M, SAEN R F, et al . Green supplier selection: A novel fuzzy double frontier data envelopment analysis model to deal with undesirable outputs and dual⁃role factors[J]. International Journal of Industrial and Systems Engineering, 2017, 25(2): 160‑181.

    • 17

      WANg Q, GENG C X . Research on financing efficiencies of strategic emerging listed companies by six⁃stage DEA model[J]. Mathematical Problems in Engineering, 2017(1): 1⁃8.

  • WeChat

    Mobile website