Abian' s Order in Near-Rings and Direct Product of Near-Fields

It is shown that a near-ring N which has no nonzero nilpotent elements is a partially ordered set where $x{\leq}y$ if and only if $yx=x^2$. Also it is shown that $(N,{\leq})$ is infinitely distributive for central elements that is $r(supx_i)=sup(rx_i)$ for every central element r of N and any subset $\{x_i\}$ of N. By using some lemmas we showed that a near-ring without nilpotent elements is isomorphic to a direct product of near-fields if and only if N is hyperatomic and orthogonally complete under the condition that every idempotent of N is central.