Title of article :
PRIME EXTENSION DIMENSION OF A MODULE
Author/Authors :
duraivel, t. pondicherry university - department of mathematics, Puducherry, India , mangayarcarassy, s. pondicherry engineering college - department of mathematics, Puducherry, India , premkumar, k. indira gandhi institute of technology - department of mathematics, Odisha, India
Abstract :
We have that for a finitely generated module M over a Noetherian ring A any two RPE filtrations of M have same length. We call this length as prime extension dimension of M and denote it as pe.dA(M). This dimension measures how far a module is from torsion freeness. We show for every submodule N of M, pe.dA(N) ≤ pe.dA(M) and pe.dA(N)+pe.dA(M/N) ≥ pe.dA(M). We compute the prime extension dimension of a module using the prime extension dimensions of its primary submodules which occurs in a minimal primary decomposition of 0 in M.
Keywords :
prime Submodules , primary Decomposition , prime filtration and regular prime extension filtration
Journal title :
Journal of Algebra and Related Topics
Journal title :
Journal of Algebra and Related Topics
