Akgöl, Sibel DoğruAkgol, Sibel DogruÖzbekler, AbdullahOzbekler, AbdullahMathematics2024-07-052024-07-05202100139-99181337-221110.1515/ms-2021-00282-s2.0-85112804264https://doi.org/10.1515/ms-2021-0028https://hdl.handle.net/20.500.14411/2046Doğru Akgöl, Sibel/0000-0003-3513-1046The de la Vallee Poussin inequality is a handy tool for the investigation of disconjugacy, and hence, for the oscillation/nonoscillation of differential equations. The results in this paper are extensions of former those of Hartman and Wintner [Quart. Appl. Math. 13 (1955), 330-332] to the impulsive differential equations. Although the inequality first appeared in such an early date for ordinary differential equations, its improved version for differential equations under impulse effect never has been occurred in the literature. In the present study, first, we state and prove a de la Vallee Poussin inequality for impulsive differential equations, then we give some corollaries on disconjugacy. We also mention some open problems and finally, present some examples that support our findings. (C) 2021 Mathematical Institute Slovak Academy of Scienceseninfo:eu-repo/semantics/closedAccessVallee Poussin inequalityGreen's functionimpulsive differential equationArticleQ1714881888WOS:000680658600008