Oscillation of a time fractional partial differential equation

P. Prakash; S. Harikrishnan; J. J. Nieto; J. H. Kim

Oscillation of a time fractional partial differential equation

P. Prakash, S. Harikrishnan, J. J. Nieto, J. H. Kim

Department of Mathematics

Research output: Contribution to journal › Article

16 Citations (Scopus)

Abstract

We consider a time fractional partial differential equation subject to the Neumann boundary condition. Several sufficient conditions are established for oscillation of solutions of such equation by using the integral averaging method and a generalized Riccati technique. The main results are illustrated by examples.

Original language	English
Journal	Electronic Journal of Qualitative Theory of Differential Equations
Publication status	Published - 2014 Jan 1

All Science Journal Classification (ASJC) codes

Applied Mathematics

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Prakash, P., Harikrishnan, S., Nieto, J. J., & Kim, J. H. (2014). Oscillation of a time fractional partial differential equation. Electronic Journal of Qualitative Theory of Differential Equations.

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abstract = "We consider a time fractional partial differential equation subject to the Neumann boundary condition. Several sufficient conditions are established for oscillation of solutions of such equation by using the integral averaging method and a generalized Riccati technique. The main results are illustrated by examples.",

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T1 - Oscillation of a time fractional partial differential equation

AU - Prakash, P.

AU - Harikrishnan, S.

AU - Nieto, J. J.

AU - Kim, J. H.

PY - 2014/1/1

Y1 - 2014/1/1

N2 - We consider a time fractional partial differential equation subject to the Neumann boundary condition. Several sufficient conditions are established for oscillation of solutions of such equation by using the integral averaging method and a generalized Riccati technique. The main results are illustrated by examples.

AB - We consider a time fractional partial differential equation subject to the Neumann boundary condition. Several sufficient conditions are established for oscillation of solutions of such equation by using the integral averaging method and a generalized Riccati technique. The main results are illustrated by examples.

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JF - Electronic Journal of Qualitative Theory of Differential Equations

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