Stability and bifurcation analysis yields conditions for the trivial equilibrium in a fractional DDE with delay-dependent coefficient, including a general result for positive delays that holds for all fractional orders.
Some stability results for the fractional differential equations with two delays
2 Pith papers cite this work. Polarity classification is still indexing.
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Numerical analysis of a two-delay sine nonlinear DDE reveals multi-scroll chaos controllable by linear feedback, with a delay-independent synchronization condition derived and chaos persisting at lower fractional orders.
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Stability and Bifurcation Analysis of Fractional Delay Differential Equation with a Delay-dependent Coefficient
Stability and bifurcation analysis yields conditions for the trivial equilibrium in a fractional DDE with delay-dependent coefficient, including a general result for positive delays that holds for all fractional orders.
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Analysis of Chaos and Bifurcation in Nonlinear two-delay differential equation
Numerical analysis of a two-delay sine nonlinear DDE reveals multi-scroll chaos controllable by linear feedback, with a delay-independent synchronization condition derived and chaos persisting at lower fractional orders.