论文信息 - The number of generators of the powers of an ideal

The number of generators of the powers of an ideal

We study the number of generators of ideals in regular rings and ask the question whether $\mu(I)<\mu(I^2)$ if $I$ is not a principal ideal, where $\mu(J)$ denotes the number of generators of an ideal $J$. We provide lower bounds for the number of generators for the powers of an ideal and also show that the CM-type of $I^2$ is $\geq 3$ if $I$ is a monomial ideal of height $n$ in $K[x_1,\ldots,x_n]$ and $n\geq 3$.

Jurgen Herzog | Maryam Mohammadei Saem | Naser Zamani | J. Herzog | N. Zamani

[1] G. Freiman. Foundations of a Structural Theory of Set Addition , 2007 .

[2] Kishor Shah. On the Cohen-Macaulayness of the fiber cone of an ideal , 1991 .

[3] B. Teissier,et al. Pseudorational local rings and a theorem of Brian\c con-Skoda about integral closures of ideals. , 1981 .

[4] E. D. Negri,et al. Contracted ideals and the Gröbner fan of the rational normal curve , 2007, 0705.3767.

[5] C. Huneke. Complete Ideals in Two-Dimensional Regular Local Rings , 1989 .

[6] Vijay Kodiyalam. Homological invariants of powers of an ideal , 1993 .

[7] Graded rings associated with contracted ideals , 2004, math/0403019.

[8] Craig Huneke,et al. Integral closure of ideals, rings, and modules , 2006 .

[9] W. Bruns,et al. Cohen-Macaulay rings , 1993 .

[10] J. Sally,et al. Birational extensions in dimension two and integrally closed ideals , 1988 .

[11] Craig Huneke,et al. Commutative Algebra I , 2012 .

[12] Takayuki Hibi,et al. Powers of monomial ideals , 2011 .