About Theory of Primary Decomposition of Monomial Ideal
C. H. Tognon *
Department of Mathematics, University of São Paulo – USP, São Carlos - S.P., Brazil.
*Author to whom correspondence should be addressed.
Abstract
In this paper, we have to R is a commutative Noetherian ring, i.e. where all ideal is finitely generated, and we have the R-module I(G), which is a monomial ideal, where I(G) is the edge ideal of a simple and finite graph G, with no isolated vertices, which is a finitely generated R-module. We consider also \(\mathfrak{a}\) an ideal of R and N a submodule of I(G) such that \(\mathfrak{a}\)I (G) \(\subseteq\) N, an inclusion of modules together with the edge ideal. Here in the article, the edge primary decomposition and irreducible decomposition of \(\mathfrak{a}\) x N are given.
Keywords: Monomial ideal, edge primary decomposition, edge dimension filtration, edge ideal of a graph