On General Principal Symmetric Ideals
Abstract
In a recent paper by Harada, Seceleanu, and Sega, the Hilbert function, betti table, and graded minimal free resolution of a general principal symmetric ideal are determined when the number of variables in the polynomial ring is sufficiently large. In this paper, we strengthen that result by giving a effective bound on the number of variables needed for their conclusion to hold. The bound is related to a well-known integer sequence involving partition numbers (OEIS A000070). Along the way, we prove a recognition theorem for principal symmetric ideals. We also introduce the class of maximal r-generated submodules, determine their structure, and connect them to general symmetric ideals.
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