%0 Journal Article
%T Fields generated by roots of $x^n+ax+b$
%A M. Ayad
%A F. Luca
%J Albanian Journal of Mathematics
%D 2009
%I AulonaPress
%X Let $a$ and $b$ be integers such that $x^n+ax+b$ is an irreducible polynomial. We study the number fields ${f Q}[|theta]$,where $ heta$ is a root of the above trinomial. We show thatif $nge 5$, then given an algebraic number field ${f K}$of degree $n$, then there are at most finitely many pairs$(a,b)$ such that ${f K}={f Q}[ heta]$.
%U http://journals.aulonapress.com/index.php/ajm/article/view/141/115