Chinese Remainder Theorem for Cyclotomic Polynomials in Z[X]

Abstract

By the Chinese remainder theorem, the canonical map \[n: R[X]/(Xn-1) d|n R[X]/d(X)\] is an isomorphism when R is a field whose characteristic does not divide n and d is the dth cyclotomic polynomial. When R is the ring Z of rational integers, this map is injective but not surjective. In this paper, we give an explicit formula for the elementary divisors of the cokernel of n(when R=Z) using the prime factorisation of n. We also give a pictorial algorithm using Young Tableaux that takes O(n3+ε) bit operations for any ε > 0 to determine a basis of Smith vectors (see Definition 3.1) for the codomain of n. In general when R is an integral domain, we prove that the determinant of : R[X]/(Πj fj) j R[X]/(fj) written with respect to the standard basis is Π1 ≤slant i < j ≤slant n R(fj, fi), where fi's are pairwise relatively prime monic polynomials and R(fj, fi) is the resultant of fj and fi.