数学与计算机科学 |
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基于振荡序列的灰色GM(1,1|sin)幂模型及其应用 |
曾亮 |
广东理工学院 基础部,广东 肇庆 526100 |
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Grey GM(1,1|sin) power model based on oscillation sequences and its application |
ZENG Liang |
Department of Basic Courses, Guangdong Polytechnic College, Zhaoqing 526100,Guangdong Province, China |
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DOI:10.13195/j.kzyjc.2012.1628 14王俊芳, 罗党. 振荡序列的分数阶离散GM(1,1)幂模型及其应用[J]. 控制与决策, 2017, 32(1):176-180.DOI:10.13195/j.kzyjc.2015.1233WANG J F, LUO D. Fractional order discrete grey GM(1,1) power model based on oscillation sequences and its application[J]. Control and Decision, 2017, 32(1):176-180. DOI:10.13195/j.kzyjc.2015.1233 15WANG Z X, PEI L L. A Fourier residual modified Nash nonlinear grey Bernoulli model for forecasting the international trade of Chinese high-tech products[J]. Grey Systems: Theory and Application, 2015, 5(2):165-177. DOI:10.1108/gs-02-2015-0003 16PEI L L, WANG Z X. The NLS-based nonlinear grey Bernoulli model with an application to employee demand prediction of high-tech enterprises in China[J]. Grey Systems: Theory and Application, 2018, 8(2):133-143. DOI:10.1108/gs-11-2017-0038 17钱吴永, 党耀国. 基于振荡序列的GM(1,1)模型[J]. 系统工程理论与实践, 2009, 29(3):149-154.DOI:10.3321/j.issn:1000-6788.2009.03.021QIAN W Y, DANG Y G. GM(1,1) model based on oscillation sequences[J]. 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