Sturmian theory for second order differential equations with mixed nonlinearities

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In the paper, Sturmian comparison theory is developed for the pair of second order differential equations; first of which is the nonlinear differential equations (1)(m(t)y′)′+s(t)y′+∑i=1nqi(t)|y|αi-1y=0,with mixed nonlinearities α1>⋯>αm>1>αm+1>⋯>αn, and the second is the nonselfadjoint differential equations (2)(k(t)x′)′+r(t)x′+p(t)x=0.Under the assumption that the solution of Eq. (2) has two consecutive zeros, we obtain Sturm–Picone type and Leighton type comparison theorems for Eq. (1) by employing the new nonlinear version of Picone’s formula that we derive. Wirtinger type inequalities and several oscillation criteria are also attained for Eq. (1). Examples are given to illustrate the relevance of the results.

论文关键词:Comparison,Leighton,Mixed nonlinear,Nonselfadjoint,Sturm–Picone,Wirtinger

论文评审过程:Available online 18 March 2015.

论文官网地址:https://doi.org/10.1016/j.amc.2015.03.001