Oscillation of Second-Order Quasilinear Generalized Difference Equations
-
Received date: February 25, 2019
Accepted date: February 25, 2019
Published date: October 2, 2018
https://doi.org/10.14419/ijet.v7i4.10.27917
-
Generalized difference equation, Oscillation, Quasilinear. -
Abstract
Authors present sufficient conditions for the oscillation solutions of the generalized perturbed quasilinear difference equation
Â
where , . Examples are illustrates the importance of our results are also included.
Â
Â
-
References
[1] Agarwal RP, Difference Equations and Inequalities, Marcel Dekker, New York, (2000).
[2] Benevatho Jaison A, Khadar Babu Sk (2016), Oscillation for generalized first order nonlinear difference equations. Global Journal of Pure and Applied Mathematics 12(1), 51-54.
[3] Benevatho Jaison A, Khadar Babu Sk (2016), Kamenev-type oscillation criteria for second order generalized delay difference equations. International Journal of Control Theory and Applications 9(28), 463-469.
[4] Benevatho Jaison A, Khadar Babu Sk (2016), Oscillation for generalized first order nonlinear a-difference equations. International Journal of Pure and Applied Mathematics 109(7), 67-74.
[5] Benevatho Jaison A, Khadar Babu Sk (2017), Oscillation theorems for generalized second-order nonlinear delay difference equations. Int. Journal of Pure and Applied Mathematics 113(9), 84-92.
[6] Benevatho Jaison A, Khadar Babu Sk (2017), Oscillation theorems for generalized second kind nonlinear delay difference equations. Int. Journal of Pure and Applied Mathematics 115(9), 25-36.
[7] Benevatho Jaison A, Khadar Babu Sk (2017), Oscillatory behavior of generalized nonlinear difference equations. Global Journal of Pure and Applied Mathematics 13(1), 205-209.
[8] Benevatho Jaison A, Khadar Babu Sk (2017), Oscillatory behavior of generalized Nonlinear difference equations. Global Journal of Pure and Applied Mathematics 13(2), 415-423.
[9] Benevatho Jaison A, Khadar Babu Sk (2018), Kamenev-type oscillation criteria for generalized sublinear delay difference equations. International Journal of Pure and Applied Mathematics 118(10), 135-145.
[10] Benevatho Jaison A, Khadar Babu Sk (2018), Oscillation for generalized second kind nonlinear delay a-difference equations. International Journal of Pure and Applied Mathematics 118(23), 507-515.
[11] Chandrasekar V, Srimanju V (2016), Oscillation for generalized second order sublinear neutral delay alpha difference equations. Global Journal of Pure and Applied Mathematics 12(1), 55-59.
[12] Chandrasekhar V, Srimanju V (2016), Qualitative properties of discrete version of generalized kneser’s and arzela-ascoli’s theorems. International Journal of Control Theory and Applications 9(28), 549-554.
[13] Cheng SS, Yan TC, Li HJ (1991), Oscillation criteria for second order nonlinear difference equations. Funkcial Ekvac 34, 223–239.
[14] Maria Susai Manuel M, Britto Antony Xavier G, Thandapani E (2006), Theory of generalized difference operator and its applications. Far East Journal of Mathematical Sciences, 20(2), 163–171.
[15] Maria Susai Manuel M, Britto Antony Xavier G, Thandapani E (2006), Qualitative properties of solutions of certain class of difference equations. Far East Journal of Mathematical Sciences 23(3), 295–304.
[16] Maria Susai Manuel M, Chandrasekar V, Britto Antony Xavier G (2013), Generalised bernoulli polynomials through weighted pochhammer symbols. Journal of Modern Methods in Numerical Mathematics 4(1), 23-29.
[17] Maria Susai Manuel M, George Maria Selvam A, Britto Antony Xavier G (2006), Rotatory and boundedness of solutions of certain class of difference equations. International Journal of Pure and Applied Mathematics 33(3), 333–343.
[18] Maria Susai Manuel M, Britto Antony Xavier G (2007), Recessive, dominant and spiral behaviours of solutions of certain class of generalized difference equations. International Journal of Differential Eqations and Applications 10(4), 423–433.
[19] Ronald E. Mickens, Difference Equations, Van Nostrand Reinhold Company, New York, (1990).
[20] Popenda J (1987), Oscillation and nonoscillation theorems for second-order difference equations. Journal of Mathematical Analysis and Applications 123, 34–38.
[21] Srimanju V, Khadar Babu Sk (2017), Oscillatory criteria for generalized second-order quasilinear neutral delay difference equations. Int. Journal of Pure and Applied Mathematics 113(9), 75-83.
[22] Srimanju V, Khadar Babu Sk (2017), Oscillation of generalized quasilinear difference equations. International Journal of Pure and Applied Mathematics 115(9), 37-45.
[23] Srimanju V, Khadar Babu Sk (2017), Oscillation criteria for generalized quasi-linear difference equations. Global Journal of Pure and Applied Mathematics 13(1), 210-216.
[24] Srimanju V, Khadar Babu Sk (2017), Oscillation criteria for generalized second kind quasi-linear neutral a-difference equations. Global Journal of Pure and Applied Mathematics 13(2), 544-551.
[25] Srimanju V, Khadar Babu Sk (2018), Oscillatory properties of third-order quasilinear generalized difference equations. International Journal of Pure and Applied Mathematics 118(10), 155-165.
[26] Srimanju V, Khadar Babu Sk (2018), Oscillation of generalized quasilinear a-difference equations. International Journal of Pure and Applied Mathematics 118(23), 497-505.
[27] Wong PJY, Agarwal RP (1995), Oscillation theorems and existence of positive monotone solutions for second order nonlinear difference equations. Mathematical and Computer Modelling 21, 63–84.
-
Downloads
-
How to Cite
Srimanju, V., Khadar Babu, S., & Chandrasekar, V. (2018). Oscillation of Second-Order Quasilinear Generalized Difference Equations. International Journal of Engineering and Technology, 7(4.10), 1050-1053. https://doi.org/10.14419/ijet.v7i4.10.27917Received date: February 25, 2019
Accepted date: February 25, 2019
Published date: October 2, 2018