A novel procedure for multimodel development using the grey silhouette coefficient for small-data-set forecasting

Small-data-set forecasting problems are a critical issue in various fields, with the early stage of a manufacturing system being a good example. Manufacturers require sufficient knowledge to minimize overall production costs, but this is difficult to achieve due to limited number of samples available at such times. This research was thus conducted to develop a modelling procedure to assist managers or decision makers in acquiring stable prediction results from small data sets. The proposed method is a two-stage procedure. First, we assessed some single models to determine whether the tendency of a real sequence can be reflected using grey incidence analysis, and we then evaluated their forecasting stability based on the relative ratio of error range. Second, a grey silhouette coefficient was developed to create an applicable hybrid forecasting model for small samples. Two real cases were analysed to confirm the effectiveness and practical value of the proposed method. The empirical results showed that the multimodel procedure can minimize forecasting errors and improve forecasting results with limited data. Consequently, the proposed procedure is considered a feasible tool for small-data-set forecasting problems.

[1]  Der-Chiang Li,et al.  Employing box-and-whisker plots for learning more knowledge in TFT-LCD pilot runs , 2012 .

[2]  Naresh K. Malhotra,et al.  Emerging lssues in Sales Forecasting and Decision Support Systems , 1988 .

[3]  Chaoqing Yuan,et al.  On novel grey forecasting model based on non-homogeneous index sequence , 2013 .

[4]  D. Berry,et al.  Statistics: Theory and Methods , 1990 .

[5]  Daisuke Yamaguchi,et al.  The development of stock exchange simulation prediction modeling by a hybrid grey dynamic model , 2008 .

[6]  George J. Klir,et al.  Fuzzy sets and fuzzy logic - theory and applications , 1995 .

[7]  Jianpei Zhang,et al.  A novel virtual sample generation method based on Gaussian distribution , 2011, Knowl. Based Syst..

[8]  J. Scott Armstrong,et al.  Beyond Accuracy: Comparison of Criteria Used to Select Forecasting Methods , 1995 .

[9]  Yi Lin,et al.  Grey Systems: Theory and Applications , 2010 .

[10]  Der-Chiang Li,et al.  An extended grey forecasting model for omnidirectional forecasting considering data gap difference , 2011 .

[11]  Claudio Moraga,et al.  A diffusion-neural-network for learning from small samples , 2004, Int. J. Approx. Reason..

[12]  Sungzoon Cho,et al.  Virtual sample generation using a population of networks , 2004, Neural Processing Letters.

[13]  Zhigeng Fang,et al.  New grey prediction model and its application in forecasting land subsidence in coal mine , 2013, Natural Hazards.

[14]  Yaser S. Abu-Mostafa,et al.  Learning from hints in neural networks , 1990, J. Complex..

[15]  Tung-I Tsai,et al.  Using virtual data effects to stabilize pilot run neural network modeling , 2013, Proceedings of 2013 IEEE International Conference on Grey systems and Intelligent Services (GSIS).

[16]  Der-Chiang Li,et al.  Forecasting short-term electricity consumption using the adaptive grey-based approach—An Asian case , 2012 .

[17]  Der-Chiang Li,et al.  A latent information function to extend domain attributes to improve the accuracy of small-data-set forecasting , 2014, Neurocomputing.

[18]  Der-Chiang Li,et al.  Utilizing an adaptive grey model for short-term time series forecasting: A case study of wafer-level packaging , 2013 .

[19]  Tomaso Poggio,et al.  Incorporating prior information in machine learning by creating virtual examples , 1998, Proc. IEEE.

[20]  EvansMark An alternative approach to estimating the parameters of a generalised Grey Verhulst model , 2014 .

[21]  Deng Ju-Long,et al.  Control problems of grey systems , 1982 .

[22]  Yu Liang,et al.  Using fractional GM(1,1) model to predict maintenance cost of weapon system , 2013, Proceedings of 2013 IEEE International Conference on Grey systems and Intelligent Services (GSIS).

[23]  P. H. K. Ho Forecasting tender price index under incomplete information , 2013, J. Oper. Res. Soc..

[24]  Diyar Akay,et al.  Grey prediction with rolling mechanism for electricity demand forecasting of Turkey , 2007 .

[25]  T. Warren Liao Diagnosis of bladder cancers with small sample size via feature selection , 2011, Expert Syst. Appl..

[26]  V. Cristina Ivanescu,et al.  Bootstrapping to solve the limited data problem in production control: an application in batch process industries , 2006, J. Oper. Res. Soc..

[27]  Essam Mahmoud,et al.  Emerging issues in sales forecasting and decision support systems , 1988 .

[28]  Shuo-Pei Chen,et al.  Forecasting of foreign exchange rates of Taiwan’s major trading partners by novel nonlinear Grey Bernoulli model NGBM(1, 1) , 2008 .

[29]  Vipul Jain,et al.  A grey approach for forecasting in a supply chain during intermittentdisruptions , 2013, Eng. Appl. Artif. Intell..

[30]  Sifeng Liu,et al.  Grey system model with the fractional order accumulation , 2013, Commun. Nonlinear Sci. Numer. Simul..

[31]  อนิรุธ สืบสิงห์,et al.  Data Mining Practical Machine Learning Tools and Techniques , 2014 .

[32]  Lifeng Wu,et al.  The effect of sample size on the grey system model , 2013 .

[33]  Der-Chiang Li,et al.  The Generalized-Trend-Diffusion modeling algorithm for small data sets in the early stages of manufacturing systems , 2010, Eur. J. Oper. Res..

[34]  Yi Lin,et al.  Grey Information - Theory and Practical Applications , 2005, Advanced Information and Knowledge Processing.

[35]  Keith W. Hipel,et al.  An optimized NGBM(1,1) model for forecasting the qualified discharge rate of industrial wastewater in China , 2011 .

[36]  Sifeng Liu,et al.  Advances in grey systems research , 2010 .

[37]  Mark Evans,et al.  An alternative approach to estimating the parameters of a generalised Grey Verhulst model: An application to steel intensity of use in the UK , 2014, Expert Syst. Appl..

[38]  E. K. Bowen,et al.  Basic Statistics for Business and Economics , 1982 .