A note on the Casas-Alvero Conjecture
Abstract
The Casas--Alvero conjecture predicts that every univariate polynomial f over a field K of characteristic zero having a common factor with each of its derivatives H\i(f) is a power of a linear polynomial. Let f=xd+a\1xd-1+·s+a\1x ∈ K[a\1,…,a\d-1][x] and let R\i = Res(f,H\i(f))∈ K[a\1,…,a\d-1] be the resultant of f and H\i(f), i ∈ \1,…,d-1\. The Casas-Alvero Conjecture is equivalent to saying that R\1,…,R\d-1 are ``independent'' in a certain sense, namely that the height ht(R\1,…,R\d-1)=d-1 in K[a\1,…,a\d-1]. In this paper we prove a very partial result in this direction : if i ∈ \d-3,d-2,d-1\ then R\i (R\1,…,R\i,…,R\d-1.
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