Özbekler, AbdullahSelvam, A. George MariaAlzabut, JehadJacintha, MaryOzbekler, AbdullahMathematics2024-07-052024-07-05202012314-88962314-888810.1155/2020/54958732-s2.0-85087070789https://doi.org/10.1155/2020/5495873https://hdl.handle.net/20.500.14411/3050Alzabut, Jehad/0000-0002-5262-1138; Selvam, George Maria/0000-0003-2004-3537The paper studies the oscillation of a class of nonlinear fractional order difference equations with damping term of the form Delta[psi(lambda)z(eta) (lambda)] + p(lambda)z(eta) (lambda) + q(lambda)F(Sigma(lambda-1+mu)(s=lambda 0) (lambda - s - 1)((-mu)) y(s)) = , where z(lambda) = a(lambda) + b(lambda)Delta(mu) y(lambda), Delta(mu) stands for the fractional difference operator in Riemann-Liouville settings and of order mu, 0 < mu <= 1, and eta >= 1 is a quotient of odd positive integers and lambda is an element of N lambda 0+1-mu. New oscillation results are established by the help of certain inequalities, features of fractional operators, and the generalized Riccati technique. We verify the theoretical outcomes by presenting two numerical examples.eninfo:eu-repo/semantics/openAccess[No Keyword Available]ArticleQ1Q12020WOS:000542349800001