Existence of positive solutions to a boundary value problem for a delayed nonlinear fractional differential system.
We discuss the discrete -Laplacian eigenvalue problem, where is a given positive integer and , . First, the existence of an unbounded continuum of positive solutions emanating from is shown under suitable conditions on the nonlinearity. Then, under an additional condition, it is shown that the positive solution is unique for any and all solutions are ordered. Thus the continuum is a monotone continuous curve globally defined for all .
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