V. Sadhasivam scite author profile

In this article, we will establish sufficient conditions for the interval oscillation of fractional partial differential equations of the form () () than whole half line. We consider f to be monotonous and non monotonous. By using a generalized Riccati technique, integral averaging method, Philos type kernals and new interval oscillation criteria are established. We also present some examples to illustrate our main results.

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On the oscillation of impulsive vector partial differential equations with distributed deviating arguments

Chatzarakis

Raja

Sadhasivam

2018

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In this paper, we consider a class of nonlinear impulsive neutral partial functional differential equations with continuous distributed deviating arguments. For this class, we establish sufficient conditions for the H-oscillation of the solutions, using impulsive differential inequalities and an averaging technique with two different boundary conditions. We provide an example to illustrate the main result.

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Interval oscillation criteria for impulsive conformable partial differential equations

Chatzarakis¹,

Logaarasi²,

Raja³

et al. 2019

APPL ANAL DISCRETE M

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In this paper, we present some sufficient conditions for the oscillation of all solutions of forced impulsive delay conformable partial differential equations. We consider two factors, namely impulse and delay that jointly affect the interval qualitative properties of the solutions of those equations. The results obtained in this paper extend and generalize some of the known results for forced impulsive conformable partial differential equations. An example illustrating the results is also given.

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On the Oscillation of Non-linear Functional Partial Differential Equations

Sadhasivam

Kavitha²,

Deepa

2017

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V. Sadhasivam

Forced Oscillation of Nonlinear Impulsive Hyperbolic Partial Differential Equation with Several Delays

Interval Oscillation Criteria for Fractional Partial Differential Equations with Damping Term

On the oscillation of impulsive vector partial differential equations with distributed deviating arguments

Interval oscillation criteria for impulsive conformable partial differential equations

On the Oscillation of Non-linear Functional Partial Differential Equations

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