Oscillation and non-oscillation of half-linear differential equations with coeffcients determined by functions having mean values

Oscillation and non-oscillation of half-linear differential equations with coeffcients determined by functions having mean values

The paper belongs to the qualitative theory of half-linear equations which are located between linear and non-linear equations and, at the same time, between ordinary and partial differential equations. We analyse the oscillation and non-oscillation of second-order half-linear differential equations...

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Bibliographic Details
Main Authors: Hasil Petr, Veselý Michal
Format: Article
Language:English
Published: De Gruyter 2018-05-01
Series:Open Mathematics
Subjects:
half-linear equation
oscillation theory
riccati technique
oscillation constant
conditional oscillation
34c10
34c15
Online Access:https://doi.org/10.1515/math-2018-0047
Description
Summary:The paper belongs to the qualitative theory of half-linear equations which are located between linear and non-linear equations and, at the same time, between ordinary and partial differential equations. We analyse the oscillation and non-oscillation of second-order half-linear differential equations whose coefficients are given by the products of functions having mean values and power functions. We prove that the studied very general equations are conditionally oscillatory. In addition, we find the critical oscillation constant.
ISSN:2391-5455

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