New Oscillation Criteria for Second-Order Forced Quasilinear Functional Differential Equations. Pasic, M. ABSTRACT AND APPLIED ANALYSIS, HINDAWI LTD, ADAM HOUSE, 3RD FLR, 1 FITZROY SQ, LONDON, W1T 5HF, ENGLAND, 2013.
doi  abstract   bibtex   
We establish some new interval oscillation criteria for a general class of second-order forced quasilinear functional differential equations with phi-Laplacian operator and mixed nonlinearities. It especially includes the linear, the one-dimensional p-Laplacian, and the prescribed mean curvature quasilinear differential operators. It continues some recently published results on the oscillations of the second-order functional differential equations including functional arguments of delay, advanced, or delay-advanced types. The nonlinear terms are of superlinear or supersublinear (mixed) types. Consequences and examples are shown to illustrate the novelty and simplicity of our oscillation criteria.
@article{WOS:000324735000001,
abstract = {We establish some new interval oscillation criteria for a general class
of second-order forced quasilinear functional differential equations
with phi-Laplacian operator and mixed nonlinearities. It especially
includes the linear, the one-dimensional p-Laplacian, and the prescribed
mean curvature quasilinear differential operators. It continues some
recently published results on the oscillations of the second-order
functional differential equations including functional arguments of
delay, advanced, or delay-advanced types. The nonlinear terms are of
superlinear or supersublinear (mixed) types. Consequences and examples
are shown to illustrate the novelty and simplicity of our oscillation
criteria.},
address = {ADAM HOUSE, 3RD FLR, 1 FITZROY SQ, LONDON, W1T 5HF, ENGLAND},
author = {Pasic, Mervan},
doi = {10.1155/2013/735360},
issn = {1085-3375},
journal = {ABSTRACT AND APPLIED ANALYSIS},
publisher = {HINDAWI LTD},
title = {{New Oscillation Criteria for Second-Order Forced Quasilinear Functional Differential Equations}},
type = {Article},
year = {2013}
}

Downloads: 0