Nonoscillation of all solutions of a higher order nonlinear delay dynamic equation on time scales

We use the fixed point theory to investigate the qualitative analysis of a nonlinear delay dynamic equation on an arbitrary time scales. We illustrate our results by applying them to various kind of time scales.

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Some Oscillation Criteria for Higher-Order Neutral Emden-Fowler Delay Dynamic Equations on Time Scales

MATEC Web of Conferences ◽

10.1051/matecconf/201822801003 ◽

2018 ◽

Vol 228 ◽

pp. 01003

Author(s):

Ying Sui ◽

Yulong Shi ◽

Yibin Sun ◽

Shurong Sun

Keyword(s):

Time Scales ◽

Dynamic Equation ◽

Higher Order ◽

Delay Equation ◽

Dynamic Equations ◽

Neutral Delay ◽

Oscillation Criteria ◽

Delay Dynamic Equations

New oscillation criteria are established for higher-order Emdn-Fowler dynamic equation $ q(v)x^{\beta } (\delta (v)) + (r(v)(z^{{\Delta ^{{n - 1}} }} (v))^{\alpha } )^{\Delta } = 0 $ on time scales, $ z(v): = p(v)x(\tau (v)) + x(v) $ Our results extend and supplement those reported in literatures in the sense that we study a more generalized neutral delay equation and do not require $ r^{\Delta } (v) \ge 0 $ and the commutativity of the jump and delay operators.

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Oscillation of Emden–Fowler type nonlinear neutral delay dynamic equation on time scales

Journal of Applied Mathematics and Computing ◽

10.1007/s12190-018-1214-8 ◽

2018 ◽

Vol 60 (1-2) ◽

pp. 291-301

Author(s):

Ying Sui ◽

Shurong Sun

Keyword(s):

Time Scales ◽

Dynamic Equation ◽

Neutral Delay ◽

Delay Dynamic Equation ◽

Neutral Delay Dynamic Equation

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Periodic Solutions in Shifts for a Nonlinear Dynamic Equation on Time Scales

Abstract and Applied Analysis ◽

10.1155/2012/707319 ◽

2012 ◽

Vol 2012 ◽

pp. 1-17 ◽

Cited By ~ 1

Author(s):

Erbil Çetin ◽

F. Serap Topal

Keyword(s):

Periodic Solution ◽

Fixed Point ◽

Fixed Point Theorem ◽

Time Scales ◽

Difference Equations ◽

Dynamic Equation ◽

Time Scale ◽

Dynamic Equations ◽

Nonlinear Dynamic Equation ◽

Nonlinear Delay

Let be a periodic time scale in shifts . We use a fixed point theorem due to Krasnosel'skiĭ to show that nonlinear delay in dynamic equations of the form , has a periodic solution in shifts . We extend and unify periodic differential, difference, -difference, and -difference equations and more by a new periodicity concept on time scales.

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Asymptotic Convergence of the Solutions of a Dynamic Equation on Discrete Time Scales

Abstract and Applied Analysis ◽

10.1155/2012/580750 ◽

2012 ◽

Vol 2012 ◽

pp. 1-20 ◽

Cited By ~ 6

Author(s):

J. Diblík ◽

M. Růžičková ◽

Z. Šmarda ◽

Z. Šutá

Keyword(s):

Time Scales ◽

Discrete Time ◽

Dynamic Equation ◽

Time Scale ◽

Asymptotic Convergence ◽

Main Attention ◽

All Solutions ◽

Convergent Solution

The paper investigates a dynamic equationΔy(tn)=β(tn)[y(tn−j)−y(tn−k)]forn→∞, wherekandjare integers such thatk>j≥0, on an arbitrary discrete time scaleT:={tn}withtn∈ℝ,n∈ℤn0−k∞={n0−k,n0−k+1,…},n0∈ℕ,tn<tn+1,Δy(tn)=y(tn+1)−y(tn), andlimn→∞tn=∞. We assumeβ:T→(0,∞). It is proved that, for the asymptotic convergence of all solutions, the existence of an increasing and asymptotically convergent solution is sufficient. Therefore, the main attention is paid to the criteria for the existence of an increasing solution asymptotically convergent forn→∞. The results are presented as inequalities for the functionβ. Examples demonstrate that the criteria obtained are sharp in a sense.

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Oscillation for Higher Order Dynamic Equations on Time Scales

Abstract and Applied Analysis ◽

10.1155/2013/268721 ◽

2013 ◽

Vol 2013 ◽

pp. 1-8 ◽

Cited By ~ 1

Author(s):

Taixiang Sun ◽

Qiuli He ◽

Hongjian Xi ◽

Weiyong Yu

Keyword(s):

Time Scales ◽

Dynamic Equation ◽

Time Scale ◽

Sufficient Conditions ◽

Continuous Functions ◽

Higher Order ◽

Dynamic Equations ◽

Positive Integers

We investigate the oscillation of the following higher order dynamic equation:{an(t)[(an-1(t)(⋯(a1(t)xΔ(t))Δ⋯)Δ)Δ]α}Δ+p(t)xβ(t)=0, on some time scaleT, wheren≥2,ak(t) (1≤k≤n)andp(t)are positive rd-continuous functions onTandα,βare the quotient of odd positive integers. We give sufficient conditions under which every solution of this equation is either oscillatory or tends to zero.

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