International Journal of Mathematics and Mathematical Sciences
Volume 17 (1994), Issue 1, Pages 41-46
doi:10.1155/S0161171294000074

Primary decomposition of torsion R[X]-modules

Abstract

This paper is concerned with studying hereditary properties of primary decompositions of torsion R[X]-modules M which are torsion free as R-modules. Specifically, if an R[X]-submodule of M is pure as an R-submodule, then the primary decomposition of M determines a primary decomposition of the submodule. This is a generalization of the classical fact from linear algebra that a diagonalizable linear transformation on a vector space restricts to a diagonalizable linear transformation of any invariant subspace. Additionally, primary decompositions are considered under direct sums and tensor product.