A universal coefficient theorem for Gauss's Lemma
We prove a version of Gauss's Lemma. It recursively constructs polynomials {c_k} for k=0,1,...,m+n, in Z[a_i,A_i,b_j,B_j] for i=0,...,m, and j=0,1,...,n, having degree at most (m+n choose m) in each of the four variable sets, such that whenever {A_i},{B_j},{C_k} are the coefficients of polynomi...
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| Zusammenfassung: | We prove a version of Gauss's Lemma. It recursively constructs polynomials
{c_k} for k=0,1,...,m+n, in Z[a_i,A_i,b_j,B_j] for i=0,...,m, and j=0,1,...,n,
having degree at most (m+n choose m) in each of the four variable sets, such
that whenever {A_i},{B_j},{C_k} are the coefficients of polynomials
A(X),B(X),C(X) with C(X)=A(X)B(X) and 1 = a_0 A_0 +...+ a_m A_m = b_0 B_0 +...+
b_n B_n, then one also has 1 = c_0 C_0 +...+ c_{m+n} C_{m+n}. |
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| DOI: | 10.48550/arxiv.1209.6307 |