Generalized Hamilton's Principle with Fractional Derivatives
classification
🧮 math.FA
keywords
fractionalalphaderivativeshamiltonprincipleconditionsderivativederive
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We generalize Hamilton's principle with fractional derivatives in Lagrangian $L(t,y(t),{}_0D_t^\al y(t),\alpha)$ so that the function $y$ and the order of fractional derivative $\alpha$ are varied in the minimization procedure. We derive stationarity conditions and discuss them through several examples.
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