What question did this study set out to answer?

To derive necessary optimality conditions for fractional variational problems under specific boundary conditions.

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March 6, 2026Open Access

Fractional Euler–Lagrange Equations Under Periodic and Antiperiodic Boundary Conditions

Key Points

To derive necessary optimality conditions for fractional variational problems under specific boundary conditions.
Derived optimality conditions for fractional problems with Caputo-type derivatives.
Analyzed functionals in spaces of absolutely continuous functions.
Examined periodic and antiperiodic boundary conditions in a unified framework.
Extended analysis to problems with integral and holonomic constraints.
Obtained fractional Euler–Lagrange equations for cases 0<α<1 and 1<α<2.
Established suitable transversality conditions for the derived equations.
Showed how results apply to both integral and holonomic constraints.

Abstract

In this work, we derive necessary optimality conditions for a class of fractional variational problems involving Caputo-type derivatives. We consider functionals defined on appropriate spaces of absolutely continuous functions and study both periodic and antiperiodic boundary conditions, treated in a unified framework. The analysis covers the cases 0<α<1 and 1<α<2, leading to fractional Euler–Lagrange equations supplemented by suitable transversality conditions. We further extend the results to problems with integral constraints and holonomic constraints, as well as to a fractional Herglotz variational principle.

Fractional Euler–Lagrange Equations Under Periodic and Antiperiodic Boundary Conditions

Key Points

Abstract

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