Symbolic powers of monomial ideals (1908.02085v1)
Abstract: Let $A = K[X_1,\ldots, X_d]$ and let $I$, $J$ be monomial ideals in $A$. Let $I_n(J) = (In \colon J\infty)$ be the $n{th}$ symbolic power of $I$ \wrt \ $J$. It is easy to see that the function $fI_J(n) = e_0(I_n(J)/In)$ is of quasi-polynomial type, say of period $g$ and degree $c$. For $n \gg 0$ say [ fI_J(n) = a_c(n)nc + a_{c-1}(n)n{c-1} + \text{lower terms}, ] where for $i = 0, \ldots, c$, $a_i \colon \mathbb{N} \rt \mathbb{Z}$ are periodic functions of period $g$ and $a_c \neq 0$. In an earlier paper we (together with Herzog and Verma) proved that $\dim I_n(J)/In$ is constant for $n \gg 0$ and $a_c(-)$ is a constant. In this paper we prove that if $I$ is generated by some elements of the same degree and height $I \geq 2$ then $a_{c-1}(-)$ is also a constant.