Multiple positive solutions for four-point boundary value problem of fractional delay differential equations with \(p\)-Laplacian operator. (English) Zbl 07354394
Summary: In this work, a class of fractional delay differential equations with four-point boundary condition and \(p\)-Laplacian operator is discussed. Based on the Avery-Peterson theorem, the existence of at least triple positive solutions is derived. A simple example is given to show the validity of the conditions of our main theorem.
MSC:
| 47Hxx | Nonlinear operators and their properties |
| 39Axx | Difference equations |
| 34Bxx | Boundary value problems for ordinary differential equations |
| 65Jxx | Numerical analysis in abstract spaces |
| 47Nxx | Miscellaneous applications of operator theory |
Keywords:
positive solution; fractional differential equation; mixed derivative; delay; \(p\)-Laplacian operatorReferences:
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