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R. Avery, J. Henderson (2004)
Existence of Three Positive Pseudo-symmetric Solutions for a One Dimensional Discrete p-LaplacianJournal of Difference Equations and Applications, 10
G. Han, Ying Wu (2007)
Nontrivial solutions of singular two-point boundary value problems with sign-changing nonlinear termsJournal of Mathematical Analysis and Applications, 325
Hai-E Zhang, Jian-Ping Sun (2012)
A generalization of the Leggett-Williams fixed point theorem and its applicationJournal of Applied Mathematics and Computing, 39
R. Avery, J. Henderson (2003)
Existence of three positive pseudo-symmetric solutions for a one dimensional p-LaplacianJournal of Mathematical Analysis and Applications, 277
Zhimin He, Xiao-shu Jiang (2006)
Triple positive solutions of boundary value problems for p-Laplacian dynamic equations on time scalesJournal of Mathematical Analysis and Applications, 321
V. Lakshmikantham, S. Sivasundaram, B. Kaymakçalan (1996)
Dynamic systems on measure chains
R. Avery, D. Anderson (2002)
Existence of three positive solutions to a second-order boundary value problem on a measure chainJournal of Computational and Applied Mathematics, 141
(1994)
On the existence of positive solutions of ordinary differential equations
L. Erbe, Shouchuan Hu, Haiyan Wang (1994)
Multiple Positive Solutions of Some Boundary Value ProblemsJournal of Mathematical Analysis and Applications, 184
D. Anderson (2005)
Eigenvalue Intervals for Even-Order Sturm-Liouville Dynamic Equations
M. Bohner, A. Peterson (2012)
Advances in Dynamic Equations on Time Scales
F. Browder (1970)
Nonlinear functional analysis
A. Sikorska-Nowak (2011)
Dynamic equations (…) on time scalesDemonstratio Mathematica. Warsaw Technical University Institute of Mathematics, 44
Q. Yao (2007)
Positive solutions of nonlinear second-order periodic boundary value problemsAppl. Math. Lett., 20
Abstract. This paper is concerned with establishing the existence of positive solutions of p -Laplacian singular boundary value problem on time scale where , and is continuous and may be singular at but not at . We establish the existence of at least one positive solution for the p -Laplacian singular boundary value problem on time scales by using the Leray–Schauder degree theory.
Advances in Pure and Applied Mathematics – de Gruyter
Published: Feb 1, 2013
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