On the Degree of Product of Two Algebraic Numbers

A triplet ( a , b , c ) of positive integers is said to be product-feasible if there exist algebraic numbers α , β and γ of degrees (over Q ) a , b and c , respectively, such that α β γ = 1 . This work extends the investigation of product-feasible triplets started by Drungilas, Dubickas and Smyth. More precisely, for all but five positive integer triplets ( a , b , c ) with a ≤ b ≤ c and b ≤ 7 , we decide whether it is product-feasible. Moreover, in the Appendix we give an infinite family or irreducible compositum-feasible triplets and propose a problem to find all such triplets.