@ARTICLE{10.21494/ISTE.OP.2023.0905, TITLE={Multiplicative Jordan type higher derivations of unital rings with non trivial idempotents}, AUTHOR={AB Hamid Kawa, S N Hasan, Bilal Ahmad Wani, }, JOURNAL={Advances in Pure and Applied Mathematics}, VOLUME={14}, NUMBER={Issue 1 (January 2023)}, YEAR={2023}, URL={https://openscience.fr/Multiplicative-Jordan-type-higher-derivations-of-unital-rings-with-non-trivial}, DOI={10.21494/ISTE.OP.2023.0905}, ISSN={1869-6090}, ABSTRACT={Suppose R is a non-zero unital associative ring with a nontrivial idempotent "e". In this paper, we prove that under some mild conditions every multiplicative jordan n-higher derivations on R is additive. Moreover, at the end of the paper, we have presented some applications of multiplicative Jordan n-higher derivations on triangular rings, nest algebra, upper triangular block matrix algebra, prime rings, von Neumann algebras.}}