Pages that link to "Item:Q1003272"

The following pages link to A sufficient condition for the global asymptotic stability of a class of logistic equations with piecewise constant delay (Q1003272):

Displaying 11 items.

• Oscillation of numerical solution in the Runge-Kutta methods for equation \(x'(t) = ax(t) + a_{0}x([t])\) (Q477536) (← links)
• Method of Lyapunov functions for differential equations with piecewise constant delay (Q555122) (← links)
• An affirmative answer to the extended Gopalsamy and Liu's conjecture on the global asymptotic stability in a population model (Q708480) (← links)
• New contractivity condition in a population model with piecewise constant arguments (Q933468) (← links)
• Global stability of nonautonomous logistic equations with a piecewise constant delay (Q974632) (← links)
• Preservation of oscillations of the Runge-Kutta method for equation \(x'(t)+ax(t)+a_1x([t - 1])=0\) (Q979928) (← links)
• A sufficient condition on global stability in a logistic equation with piecewise constant ar\-gu\-ments (Q1409286) (← links)
• Numerical oscillation and non-oscillation for differential equation with piecewise continuous arguments of mixed type (Q1735128) (← links)
• Asymptotic stability for delayed logistic type equations (Q2473106) (← links)
• Preservation of Oscillations in the Runge-Kutta Method for a Type of Advanced Differential Equation (Q2795097) (← links)
• Oscillation analysis of numerical solutions in the \(\theta\)-methods for differential equation of advanced type (Q2795290) (← links)