Positive solutions for higher order multi-point boundary value problems with nonhomogeneous boundary conditions
Copyright policy )Positive solutions for higher order multi-point boundary value problems with nonhomogeneous boundary conditions
The authors discuss the existence of positive solutions for the \(n\)th order boundary value problem \[ \begin{aligned} &u^{(n)}+g(t)f(t,u)=0, \quad 0
- University of Tennessee at Chattanooga United States
- University of Hong Kong China (People's Republic of)
- City University of Hong Kong Hong Kong
- City University of Hong Kong China (People's Republic of)
positive solutions, Applications of operator theory to differential and integral equations, boundary value problems, Nonhomogeneous boundary conditions, Applied Mathematics, Krein–Rutman theorem, Positive solutions to nonlinear boundary value problems for ordinary differential equations, nonhomogeneous boundary conditions, Kreín-Rutman theorem, Boundary value problems, Fixed point index, Nonlocal and multipoint boundary value problems for ordinary differential equations, fixed point index, Positive solutions, Analysis
positive solutions, Applications of operator theory to differential and integral equations, boundary value problems, Nonhomogeneous boundary conditions, Applied Mathematics, Krein–Rutman theorem, Positive solutions to nonlinear boundary value problems for ordinary differential equations, nonhomogeneous boundary conditions, Kreín-Rutman theorem, Boundary value problems, Fixed point index, Nonlocal and multipoint boundary value problems for ordinary differential equations, fixed point index, Positive solutions, Analysis
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