In this article, we show that the oscillation of all solutions to the neutral equation [x (t) - R (t) N (x (t - κ))]' + Xn i=1 Pi (t) Fi (x (t - τi)) - Xm j=1 Qj (t) Gj (x (t - σj )) = 0 is implied by the oscillation of all solutions to the linear equation [x (t) - rx (t - κ)]' + Xn i=1 pix (t - τi) - Xm j=1 qjx (t - σj ) = 0. In these equations, R,Pi , Qj are positive and continuous functions, and κ, τi , σj are positive constants that represent delays

}, keywords = {34C10, 34K40, 34K99}, issn = {1056-2176}, url = {https://acadsol.eu/dsa/articles/19/15-DSA-239.pdf}, author = {MUSTAFA KEMAL YILDIZ} }