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An even-order three-point boundary value problem on time scales |
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| Authors: | Douglas R Anderson Richard I Avery |
| Affiliation: | a Department of Mathematics, Concordia College, Moorhead, MN 56562, USA b College of Natural Sciences, Dakota State University, Madison, SD 57042, USA |
| Abstract: | We study the even-order dynamic equation (−1)nx(Δ∇)n(t)=λh(t)f(x(t)), t∈[a,c] satisfying the boundary conditions x(Δ∇)i(a)=0 and x(Δ∇)i(c)=βx(Δ∇)i(b) for 0?i?n−1. The three points a,b,c are from a time scale  , where 0<β(b−a)<c−a for b∈(a,c), β>0, f is a positive function, and h is a nonnegative function that is allowed to vanish on some subintervals of [a,c] of the time scale. |
| Keywords: | Boundary value problem Cone Green's function Delta-nabla dynamic equation |
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