Nonconservative Systems Within Fractional Generalized Derivatives
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Abstract
Fractional calculus is a promising tool for investigation of both conservative and non-conservative systems. Fractional Hamiltonian formulation represents an important problem of the fractional quantization. In this paper the nonconservative Lagrangian mechanics is investigated within fractional generalized derivative approach.
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Keywords
Fractional Derivatives, Generalized Derivatives, Nonconservative Systems, fractional derivatives, fractional Euler-Lagrange equations, Fractional derivatives and integrals, fractional Lagrangian, nonconservative systems, fractional Hamiltonian, Lagrange's equations, generalized derivatives
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0103 physical sciences, 01 natural sciences
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Volume
2
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PART 1
Start Page
73
End Page
78
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checked on Jun 19, 2026
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