Abstract :
Let F ⊂ K be fields of characteristic 0, and let K x denote the ring of polynomials
with coefficients in K.Le t p x = n
k=0 akxk ∈ K x an = 0.F or p ∈ K x \F x ,
define DF p , the F deficit of p, to equal n − max 0 ≤ k ≤ n
ak /∈ F .Fo r
p ∈ F x , define DF p = n.Le t p x = n
k=0 akxk and let q x = m
j=0 bjxj
with an = 0, bm = 0, an bm ∈ F, bj /∈ F for some j ≥ 1.Suppose that p ∈
K x , q ∈ K x \F x p not constant.Our main result is that p ◦ q /∈ F x and
DF p ◦ q = DF q .W ith only the assumption that anbm ∈ F, we prove the inequality
DF p ◦ q ≥ DF q .This inequality also holds if F and K are only rings.Similar
results are proven for fields of finite characteristic with the additional assumption
that the characteristic of the field does not divide the degree of p.Finally we extend
our results to polynomials in two variables and compositions of the form p q x y ,
where p is a polynomial in one variable.
