@article{El Azhari_2024, title={A note on n-Jordan homomorphisms}, volume={62}, url={http://matstud.org.ua/ojs/index.php/matstud/article/view/421}, DOI={10.30970/ms.62.1.77-80}, abstractNote={<p>{Let $ A, B $ be two rings and $ n\geqslant 2 $ be an integer. An additive map $ h\colon A\rightarrow B $ is called an $n$-Jordan homomorphism if $ h(x^{n})=h(x)^{n} $ for all $ x\in A;$ $h$ is called an n-homomorphism or an anti-$n$-homomorphism if $ h(\prod_{i=1}^{n}x_{i})=\prod_{i=1}^{n} h(x_{i})$ or $ h(\prod_{i=1}^{n}x_{i})=\prod_{i=0}^{n-1} h(x_{n-i}), <br>$ respectively, for all $ x_{1},...,x_{n}\in A. $}</p> <p>{We give the following variation of a theorem on n-Jordan homomorphisms due to I.N. Herstein: Let $n\geq 2$ be an integer and $h$ be an $n-$Jordan <br>homomorphism from a ring $A$ into a ring $B$ of characteristic greater than $n$. <br>Suppose further that $A$ has a unit $e$, then $h = h(e)\tau$, where $h(e)$ is in the centralizer of $h(A)$ and $\tau$ is a Jordan homomorphism.}</p> <p>{By using this variation, we deduce the following result of G. An: Let $A$ and $B$<br>be two rings, where $A$ has a unit and $B$ is of characteristic greater than an integer $n \geq 2$. If every Jordan homomorphism from $A$ into $B$ is a homomorphism (anti-homomorphism), then every $n-$Jordan homomorphism from $A$ into $B$ is an $n$-homomorphism (anti-$n$-homomorphism).<br>As a consequence of an appropriate lemma, we also obtain the following result<br>of E. Gselmann: Let $A, B$ be two commutative rings and $B$ is of characteristic greater than an integer $n\geq 2$. Then every $n$-Jordan homomorphism from $A$ into<br>$B$ is an $n-$homomorphism.}</p>}, number={1}, journal={Matematychni Studii}, author={El Azhari, M.}, year={2024}, month={Sep.}, pages={77-80} }