Oscillation and nonoscillation of perturbed nonlinear equations with p‐Laplacian

In this paper, we analyze oscillatory properties of perturbed half‐linear differential equations (i.e., equations with one‐dimensional p‐Laplacian). The presented research covers the Euler and Riemann–Weber type equations with very general coefficients. We prove an oscillatory result and a nonoscillatory one, which show that the studied equations are conditionally oscillatory (i.e., there exists a certain threshold value that separates oscillatory and nonoscillatory equations). The obtained criteria are easy to use. Since the number of perturbations is arbitrary, we solve the oscillation behavior of the equations in the critical setting when the coefficients give exactly the threshold value. The results are new for linear equations as well.

[1]  J. Šišoláková Non‐oscillation of linear and half‐linear differential equations with unbounded coefficients , 2020, Mathematical Methods in the Applied Sciences.

[2]  P. Hasil,et al.  Riccati transformation and nonoscillation criterion for linear difference equations , 2020, Proceedings of the American Mathematical Society.

[3]  Said R. Grace,et al.  Oscillation criteria for second‐order Emden–Fowler delay differential equations with a sublinear neutral term , 2020, Mathematische Nachrichten.

[4]  A. Alsaedi,et al.  Oscillation and nonoscillation theorems of neutral dynamic equations on time scales , 2019, Advances in Difference Equations.

[5]  Z. Pátíková Nonoscillatory solutions of half‐linear Euler‐type equation with n terms , 2019, Mathematical Methods in the Applied Sciences.

[6]  S. Santra Necessary and sufficient conditions for oscillation to second-order half-linear delay differential equations , 2019, Journal of Fixed Point Theory and Applications.

[7]  Z. Došlá,et al.  Euler type linear and half-linear differential equations and their non-oscillation in the critical oscillation case , 2019, Journal of Inequalities and Applications.

[8]  Petr Hasil,et al.  Averaging technique and oscillation criterion for linear and half-linear equations , 2019, Appl. Math. Lett..

[9]  A. Alsaedi,et al.  Necessary and sufficient conditions for oscillation of second‐order dynamic equations on time scales , 2019, Mathematical Methods in the Applied Sciences.

[10]  Naoto Yamaoka,et al.  Oscillation constants for Euler type differential equations involving the p(t)-Laplacian , 2019, Journal of Mathematical Analysis and Applications.

[11]  H. Adiguzel Oscillatory behavior of solutions of certain fractional difference equations , 2018, Advances in Difference Equations.

[12]  H. Adiguzel Oscillation theorems for nonlinear fractional difference equations , 2018, Boundary Value Problems.

[13]  P. Hasil,et al.  Oscillation and non‐oscillation results for solutions of perturbed half‐linear equations , 2018 .

[14]  Petr Hasil,et al.  Oscillation and non-oscillation of half-linear differential equations with coeffcients determined by functions having mean values , 2018 .

[15]  P. Řehák,et al.  Oscillation constants for second-order nonlinear dynamic equations of Euler type on time scales , 2017 .

[16]  P. Hasil,et al.  Oscillation and non-oscillation criteria for linear and half-linear difference equations , 2017 .

[17]  Adil Misir,et al.  Critical Oscillation Constant for Euler Type Half-Linear Differential Equation Having Multi-Different Periodic Coefficients , 2017 .

[18]  Ondrej Doslý,et al.  Generalized Prüfer angle and oscillation of half-linear differential equations , 2017, Appl. Math. Lett..

[19]  Adil Misir,et al.  Oscillation and nonoscillation of half-linear Euler type differential equations with different periodic coefficients , 2017 .

[20]  B. Karpuz Nonoscillation and oscillation of second-order linear dynamic equations via the sequence of functions technique , 2016 .

[21]  Adil Misir,et al.  CRITICAL OSCILLATION CONSTANT FOR HALF LINEAR DIFFERENTIAL EQUATIONS WHICH HAVE DIFFERENT PERIODIC COEFFICIENTS , 2016 .

[22]  Michal Veselý,et al.  Conditional oscillation of Euler type half-linear differential equations with unbounded coefficients , 2016 .

[23]  Michal Veselý,et al.  Oscillation and non-oscillation of Euler type half-linear differential equations , 2015 .

[24]  Petr Hasil,et al.  Limit periodic homogeneous linear difference systems , 2015, Appl. Math. Comput..

[25]  P. Hasil,et al.  Oscillation constants for half-linear difference equations with coefficients having mean values , 2015 .

[26]  P. Hasil,et al.  Conditional oscillation of half-linear Euler-type dynamic equations on time scales , 2015 .

[27]  Jirí Vítovec,et al.  Critical oscillation constant for Euler-type dynamic equations on time scales , 2014, Appl. Math. Comput..

[28]  P. Hasil,et al.  Conditional oscillation of Riemann-Weber half-linear differential equations with asymptotically almost periodic coefficients , 2014 .

[29]  Petr Hasil,et al.  Conditional Oscillation of Half-Linear Differential Equations with Coefficients Having Mean Values , 2014 .

[30]  O. Doslý,et al.  Euler Type Half-Linear Differential Equation with Periodic Coefficients , 2013 .

[31]  P. Hasil,et al.  Oscillation and Nonoscillation of Asymptotically Almost Periodic Half-Linear Difference Equations , 2013 .

[32]  O. Doslý,et al.  Conditional oscillation and principal solution of generalizedhalf-linear differential equation , 2013 .

[33]  Naoto Yamaoka Oscillation criteria for second-order nonlinear difference equations of Euler type , 2012 .

[34]  Naoto Yamaoka Oscillation criteria for second-order nonlinear difference equations of Euler type , 2012, Advances in Difference Equations.

[35]  O. Doslý,et al.  Perturbations of Half-Linear Euler Differential Equation and Transformations of Modified Riccati Equation , 2012 .

[36]  O. Doslý,et al.  Half-linear Euler differential equations in the critical case , 2011 .

[37]  P. Hasil,et al.  Critical oscillation constant for half-linear differential equations with periodic coefficients , 2011 .

[38]  K. Wirths,et al.  Weighted hardy inequalities with sharp constants , 2010 .

[39]  Lynn Erbe,et al.  Oscillation and nonoscillation of solutions of second order linear dynamic equations with integrable coefficients on time scales , 2009, Appl. Math. Comput..

[40]  Zhiting Xu OSCILLATION AND NONOSCILLATION OF SOLUTIONS OF PDE WITH p−LAPLACIAN , 2009 .

[41]  Jitsuro Sugie,et al.  A nonoscillation theorem for half-linear differential equations with periodic coefficients , 2008, Appl. Math. Comput..

[42]  Gerald Teschl,et al.  Effective Prüfer angles and relative oscillation criteria , 2007, 0709.0127.

[43]  J. Sugie,et al.  Comparison theorems for oscillation of second-order half-linear differential equations , 2006 .

[44]  T. Tanigawa,et al.  Comparison Theorems for Perturbed Half-linear Euler Differential Equations (Functional Equations and Complex Systems) , 2005 .

[45]  Ravi P. Agarwal,et al.  Oscillation Theory for Second Order Linear, Half-Linear, Superlinear and Sublinear Dynamic Equations , 2002 .

[46]  Jitsuro Sugie,et al.  Oscillation criteria for second order nonlinear differential equations of Euler type , 2001 .

[47]  Norio Yoshida,et al.  A Picone-type identity and Sturmian comparison and oscillation theorems for a class of half-linear partial differential equations of second order , 2000 .

[48]  Karl Michael Schmidt,et al.  Critical Coupling Constants and Eigenvalue Asymptotics of Perturbed Periodic Sturm–Liouville Operators , 2000 .

[49]  Á. Elbert,et al.  Perturbations of the Half-Linear Euler Differential Equation , 2000 .

[50]  K. Schmidt Oscillation of the perturbed Hill equation and the lower spectrum of radially periodic Schrodinger operators in the plane , 1999 .

[51]  Simona Fisnarová,et al.  Hille–Nehari type criteria and conditionally oscillatory half-linear differential equations , 2019, Electronic Journal of Qualitative Theory of Differential Equations.

[52]  P. Hasil,et al.  Oscillatory and non-oscillatory solutions of dynamic equations with bounded coefficients , 2018 .

[53]  Simona Fisnarová,et al.  Perturbed generalized half-linear Riemann–Weber equation – further oscillation results , 2017 .

[54]  Naoto Yamaoka,et al.  General solutions of second-order linear difference equations of Euler type , 2017 .

[55]  O. Doslý Electronic Journal of Qualitative Theory of Differential Equations Half-linear Euler Differential Equation and Its Perturbations , 2022 .

[56]  Ondřej Došlý,et al.  Oscillation constants for second-order ordinary differential equations related to elliptic equations with p-Laplacian , 2015 .

[57]  Petr Hasil,et al.  Almost periodic transformable difference systems , 2012, Appl. Math. Comput..

[58]  Michal Veselý,et al.  Construction of almost periodic functions with given properties , 2011 .

[59]  R. Marík,et al.  Generalized Picone and Riccati inequalities for half-linear differential operators with arbitrary elliptic matrices. , 2010 .

[60]  O. Doslý,et al.  Linearized Riccati Technique and (Non-)Oscillation Criteria for Half-Linear Difference Equations , 2007 .

[61]  Ondřej Došlý,et al.  Half-linear differential equations , 2005 .

[62]  O. Doslý,et al.  Nonexistence of Positive Solutions of PDE's with p-Laplacian , 2001 .

[63]  Fritz Gesztesy,et al.  Perturbative Oscillation Criteria and Hardy‐Type Ineqalities , 1998 .

[64]  J. Sugie,et al.  Nonlinear oscillations of second order differential equations of Euler type , 1996 .