| 具有变系数的2n+1阶中立型微分方程正解的存在性 |
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| 引用本文: | 王再玉,汤林芬. 具有变系数的2n+1阶中立型微分方程正解的存在性[J]. 北华大学学报(社会科学版), 1999, 0(5) |
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| 作者姓名: | 王再玉 汤林芬 |
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| 作者单位: | 长春建筑材料工业学校!长春市(王再玉),吉林师范学院!吉林市(汤林芬) |
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| 摘 要: | 本文利用 Knaster不动点定理,Levi引理,给出具有变系数 P(t)的 2n+ 1阶中立型微分 方程[x(t)-p(t)_x(t-2)]~(2n+1)+f(t,x(t-τ_1(t)),…,x(t-τ_m(t))=0正解存在的几个充分 条件.本文结果部分地回答了文21提出的问题.
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| 关 键 词: | 变系数 2n+1阶中立型微分方程 正解的存在性 |
Existence of Positive Solutions for 2n+1 Order Neutral Differential Equations with a Minor Variable Coefficient |
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| Wan Zaiyu. Existence of Positive Solutions for 2n+1 Order Neutral Differential Equations with a Minor Variable Coefficient[J]. , 1999, 0(5) |
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| Authors: | Wan Zaiyu |
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| Abstract: | In this paper, by Using the Knaster fixed Point theorem the levi lemma, we have given come sufficient of existence of positive solutions for 2n + 1 order neutral differential equations With n is a nonnegtive ingeger and P(t) is a voriable Coefficient. The results obtained answer partially an open problen in [1]. |
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| Keywords: | Variable Coefficient 2n + 1 Order neutral differential equations existence of positive solutions |
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