Fractional Complex Euler–Lagrange Equation: Nonconservative Systems

Antonela Toma; Octavian Postavaru

doi:10.3390/fractalfract7110799

Fractal and Fractional (Nov 2023)

Fractional Complex Euler–Lagrange Equation: Nonconservative Systems

Antonela Toma,
Octavian Postavaru

Affiliations

Antonela Toma: Center for Research and Training in Innovative Techniques of Applied Mathematics in Engineering, University Politehnica of Bucharest, Splaiul Independentei 313, 060042 Bucharest, Romania
Octavian Postavaru: Center for Research and Training in Innovative Techniques of Applied Mathematics in Engineering, University Politehnica of Bucharest, Splaiul Independentei 313, 060042 Bucharest, Romania

DOI: https://doi.org/10.3390/fractalfract7110799
Journal volume & issue: Vol. 7, no. 11
p. 799

Abstract

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Classical forbidden processes paved the way for the description of mechanical systems with the help of complex Hamiltonians. Fractional integrals of complex order appear as a natural generalization of those of real order. We propose the complex fractional Euler-Lagrange equation, obtained by finding the stationary values associated with the fractional integral of complex order. The complex Hamiltonian obtained from the Lagrangian is suitable for describing nonconservative systems. We conclude by presenting the conserved quantities attached to Noether symmetries corresponding to complex systems. We illustrate the theory with the aid of the damped oscillatory system.

Published in Fractal and Fractional

ISSN: 2504-3110 (Online)
Publisher: MDPI AG
Country of publisher: Switzerland
LCC subjects: Science: Physics: Heat: Thermodynamics; Science: Mathematics: Analysis
Website: http://www.mdpi.com/journal/fractalfract

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