On some resultants formulas of Schur type
Abstract
Let (rA,n(x))n ∈ N be a sequence of polynomials with coefficients from a field K satisfying the recurrence relation rA,n(x)= Σ|α|≤ m tα,n(x)rA,nα(x) of order d+1 ∈ N+, where tα,n ∈ K[x], m ∈ N+ are fixed, α ∈ Nd+1, |α| = α0 + …+αd and rA,nα(x)=rA,n-1α0(x)rA,n-2α1(x)·s rA,n-d-1αd(x). We show that under mild assumptions on the initial polynomials rA,0, …, rA,d and the coefficients tα,n, we can give the expression for the resultant Res(rA,n, rA,n-1). Our results generalize recent result of Ulas concerning the case m=1 and d=1.
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