二维无界时滞微分方程组的Bernfeld-Haddock猜想

[1] New Results on Periodicity of Non-autonomous Inertial Neural Networks Involving Non-reduced Order Method [J]. NEURAL PROCESSING LETTERS, 2019, 50 (01) : 595 - 606

[2] Asymptotic behavior of solutions to a class of non-autonomous delay differential equations.[J].Bingwen Liu.Journal of Mathematical Analysis and Applications.2017, 1

[3] A generalization of the Bernfeld–Haddock conjecture.[J].Bingwen Liu.Applied Mathematics Letters.2017,

[4] ASYMPTOTIC BEHAVIOR OF SOLUTIONS TO A NON-AUTONOMOUS SYSTEM OF TWO-DIMENSIONAL DIFFERENTIAL EQUATIONS.[J].Xiao Songlin.ELECTRONIC JOURNAL OF DIFFERENTIAL EQUATIONS.2017,

[5] 实变函数论.[M].周民强.北京大学出版社.2016,

[6] 一类无界时滞微分新古典增长模型的μ-稳定性 [J]. 湖南文理学院学报(自然科学版), 2024, 36 (01) : 14 - 19

[7] Bernfeld-Haddock猜想的推广形式及其证明 [J]. 数学学报, 2007, (02) : 261 - 270

[8] 某些无界时滞微分方程的渐近性.[J].陈伯山.数学学报.1990, 03

[9] 一类非自治时滞微分方程的渐近性.[J].陈伯山.科学通报.1988, 06

[10] 某些时滞微分方程解的渐近性质.[J].丁同仁.中国科学.1981, 08

[1] New Results on Periodicity of Non-autonomous Inertial Neural Networks Involving Non-reduced Order Method [J]. NEURAL PROCESSING LETTERS, 2019, 50 (01) : 595 - 606

[2] Asymptotic behavior of solutions to a class of non-autonomous delay differential equations.[J].Bingwen Liu.Journal of Mathematical Analysis and Applications.2017, 1

[3] A generalization of the Bernfeld–Haddock conjecture.[J].Bingwen Liu.Applied Mathematics Letters.2017,

[4] ASYMPTOTIC BEHAVIOR OF SOLUTIONS TO A NON-AUTONOMOUS SYSTEM OF TWO-DIMENSIONAL DIFFERENTIAL EQUATIONS.[J].Xiao Songlin.ELECTRONIC JOURNAL OF DIFFERENTIAL EQUATIONS.2017,

[5] 实变函数论.[M].周民强.北京大学出版社.2016,

[6] 一类无界时滞微分新古典增长模型的μ-稳定性 [J]. 湖南文理学院学报(自然科学版), 2024, 36 (01) : 14 - 19

[7] Bernfeld-Haddock猜想的推广形式及其证明 [J]. 数学学报, 2007, (02) : 261 - 270

[8] 某些无界时滞微分方程的渐近性.[J].陈伯山.数学学报.1990, 03

[9] 一类非自治时滞微分方程的渐近性.[J].陈伯山.科学通报.1988, 06

[10] 某些时滞微分方程解的渐近性质.[J].丁同仁.中国科学.1981, 08