有干预措施的戒烟模型的全局动力学(3)
[1] CASTILLO-GARSOW C, JORDAN-SALIVIA G, RODRIGUEZ-HERRERA models for the dynamics of tobacco use, recovery and relapse[J].1997. [2] 李志民, 苏宁亚, 张太雷.一类具有非线性发生率的戒烟模型动力学分析[J].数学的实践与认识, 2019, 49(23):262-268. [3] 王霞, 李保林, 葛情.一类具有非线性接触率的戒烟模型[J].信阳师范学院学报(自然科学版), 2019, 32(3):362-366. [4] SHARMA A, MISRA A bifurcation in a smoking cessation model with media campaigns[J].Applied Mathematical Modelling, 2015, 39(3-4):1087-1098. [5] GUERRERO F, FRANCISCO-JOSéSANTONJA, VILLANUEVA R the spanish smoke-free legislation of 2006: a new method to quantify its impact using a dynamic model[J].International Journal of Drug Policy, 2011, 22(4):247-251. [6] WHO, Tobacco fact sheet 339.(2020-05-27)[2019-07-26 [7] SHAROMI O, GUMEL A smoking dynamics: a mathematical modeling approach[J].Applied Mathematics and Computation, 2008, 195(2):475-499. [8] GUERRERO F, SANTONJA F J, VILLANUEVA R a model for the evolution of smoking habit in Spain with homotopy analysis method[J].Nonlinear Analysis: Real World Applications, 2013, 14(1):549-558. [9] Zeb A, ZAMAN G, MOMANI dynamics of a giving up smoking model[J].Applied Mathematical Modelling, 2013, 37(7):5326-5334. [10] WANG J, ZHANG F, WANG , pseudo-equilibrium and sliding-mode heteroclinic orbit in a Filippov-type plant disease model[J].Nonlinear Analysis: Real World Applications, 2016, 31:308-324. [11] WANG A , XIAO bifurcation and global dynamics of a Filippov epidemic model with vaccination.[J].International Journal of Bifurcation and Chaos, 2013, 23(08):. [12] 王爱丽, 王亚强.一类具有健康教育干预的Filippov手足口病模型[J].武汉大学学报, 2019, 65(6):601-608. [13] 边彩莲, 黄立宏, 王佳伏.基于媒体报道的Filippov传染病模型的全局动力学[J].经济数学, 2019, 36(1):89-95. [14] 蔡佐威, 黄立宏.动态经济学数学建模及稳定化控制分析[J].经济数学, 2018, 35(2):30-36. [15] GUO Z, HUANG L, ZOU X.Impact of discontinuous treatments on disease dynamics in an SIR epidemic model[J].Mathematical Biosciences and Engineering Mbe, 2013, 9(1):97-110. [16] CHONG N S, SMITH R avian influenza using Filippov systems to determine culling of infected birds and quarantine[J].Nonlinear Analysis Real World Applications, 2015, 24:196-218. [17] CHEN C, KANG motion and global dynamics of a Filippov fire-blight model with economic thresholds[J].Nonlinear Analysis: Real World Applications, 2018, 39:492-519. [18] FILIPPOV A equations with discontinuous right-hand sides[M].The Netherlands: Kluwer Academic Publishers, 1988. 马慧丽(1993—), 女, 河南三门峡人, 硕士研究生,研究方向:微分方程 E-mail:
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