Oscillating Control Moment Gyroscope Mathematical Model Development, Verification and Results

Date

2020-02-15

Author

Akbulut, Burak
Arberkli, Ferhat
Azgın, Kıvanç
Tekinalp, Ozan

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https://www.meeting-schedule.com/ists2019/schedule.html
https://hdl.handle.net/11511/82213

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Oscillatory behavior of solutions of difference equations Yalçın, Yasemin; Ağacık, Zafer Birgül; Department of Mathematics (1999)
Oscillating Control Moment Gyroscope Experimental Results AKBULUT, BURAK; ARBERKLİ, FERHAT; Azgın, Kıvanç; Tekinalp, Ozan (2019-01-07)
Oscillation of Second-Order Mixed-Nonlinear Delay Dynamic Equations Unal, M.; Zafer, Ağacık (Springer Science and Business Media LLC, 2010-01-01) New oscillation criteria are established for second-order mixed-nonlinear delay dynamic equations on time scales by utilizing an interval averaging technique. No restriction is imposed on the coefficient functions and the forcing term to be nonnegative.
Oscillation of fourth-order nonlinear neutral delay dynamic equations Grace, S. R.; Zafer, Ağacık (2015-04-01) In this work we establish some new sufficient conditions for oscillation of fourth-order nonlinear neutral delay dynamic equations of the form (a(t)([x(t) - p(t) x(h(t))](Delta Delta Delta))(alpha))(Delta) + q(t)x(beta)(g(t)) = 0, t is an element of [t(0),infinity) T, where alpha and beta are quotients of positive odd integers with beta <= alpha.
Oscillation criteria for first and second orer impulsive delay differential equations ALZabut, Jehad; Ağacık, Zafer; Department of Mathematics (1999)

Citation Formats

B. Akbulut, F. Arberkli, K. Azgın, and O. Tekinalp, “Oscillating Control Moment Gyroscope Mathematical Model Development, Verification and Results,” 2020, Accessed: 00, 2021. [Online]. Available: https://www.meeting-schedule.com/ists2019/schedule.html.