Triple solutions of complementary Lidstone boundary value problems via fixed point theorems
We consider the following complementary Lidstone boundary value problem: (−1) m y (2m+1) (t)=F(t,y(t),y ′ (t)),t∈[0,1], y(0)=0,y (2k−1) (0)=y (2k−1) (1)=0,1≤k≤m. By using fixed point theorems of Leggett-Williams and Avery, we offer several criteria for the existence of three positiv...
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sg-ntu-dr.10356-1017092020-03-07T14:00:33Z Triple solutions of complementary Lidstone boundary value problems via fixed point theorems Wong, Patricia Jia Yiing School of Electrical and Electronic Engineering DRNTU::Engineering::Electrical and electronic engineering We consider the following complementary Lidstone boundary value problem: (−1) m y (2m+1) (t)=F(t,y(t),y ′ (t)),t∈[0,1], y(0)=0,y (2k−1) (0)=y (2k−1) (1)=0,1≤k≤m. By using fixed point theorems of Leggett-Williams and Avery, we offer several criteria for the existence of three positive solutions of the boundary value problem. Examples are also included to illustrate the results obtained. We note that the nonlinear term F depends on y ′ and this derivative dependence is seldom investigated in the literature and a new technique is required to tackle the problem. Published version 2014-06-13T04:10:22Z 2019-12-06T20:43:08Z 2014-06-13T04:10:22Z 2019-12-06T20:43:08Z 2014 2014 Journal Article Wong, P. J. Y. (2014). Triple solutions of complementary Lidstone boundary value problems via fixed point theorems. Boundary Value Problems, 2014(1), 125-. 1687-2770 https://hdl.handle.net/10356/101709 http://hdl.handle.net/10220/19750 10.1186/1687-2770-2014-125 en Boundary value problems © 2014 Wong; licensee Springer. This is an open access article distributed under the terms of the Creative Commons Attribution License (http://creativecommons.org/licenses/by/2.0), which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited. application/pdf |
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DRNTU::Engineering::Electrical and electronic engineering Wong, Patricia Jia Yiing Triple solutions of complementary Lidstone boundary value problems via fixed point theorems |
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We consider the following complementary Lidstone boundary value problem:
(−1) m y (2m+1) (t)=F(t,y(t),y ′ (t)),t∈[0,1], y(0)=0,y (2k−1) (0)=y (2k−1) (1)=0,1≤k≤m.
By using fixed point theorems of Leggett-Williams and Avery, we offer several criteria for the existence of three positive solutions of the boundary value problem. Examples are also included to illustrate the results obtained. We note that the nonlinear term F depends on y ′ and this derivative dependence is seldom investigated in the literature and a new technique is required to tackle the problem. |
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School of Electrical and Electronic Engineering |
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School of Electrical and Electronic Engineering Wong, Patricia Jia Yiing |
| format |
Article |
| author |
Wong, Patricia Jia Yiing |
| author_sort |
Wong, Patricia Jia Yiing |
| title |
Triple solutions of complementary Lidstone boundary value problems via fixed point theorems |
| title_short |
Triple solutions of complementary Lidstone boundary value problems via fixed point theorems |
| title_full |
Triple solutions of complementary Lidstone boundary value problems via fixed point theorems |
| title_fullStr |
Triple solutions of complementary Lidstone boundary value problems via fixed point theorems |
| title_full_unstemmed |
Triple solutions of complementary Lidstone boundary value problems via fixed point theorems |
| title_sort |
triple solutions of complementary lidstone boundary value problems via fixed point theorems |
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2014 |
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https://hdl.handle.net/10356/101709 http://hdl.handle.net/10220/19750 |
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1681040482531016704 |