Title of article
Combinatorics of multigraded Poincaré series for monomial rings
Author/Authors
Alexander Berglund، نويسنده , , Jonah Blasiak، نويسنده , , Patricia Hersh، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2007
Pages
18
From page
73
To page
90
Abstract
Backelin proved that the multigraded Poincaré series for resolving a residue field over a polynomial ring modulo a monomial ideal is a rational function. The numerator is simple, but until the recent work of Berglund there was no combinatorial formula for the denominator. Berglundʹs formula gives the denominator in terms of ranks of reduced homology groups of lower intervals in a certain lattice. We now express this lattice as the intersection lattice of a subspace arrangement , use Crapoʹs Closure Lemma to drastically simplify the denominator in some cases (such as monomial ideals generated in degree two), and relate Golodness to the Cohen–Macaulay property for associated posets. In addition, we introduce a new class of finite lattices called complete lattices, prove that all geometric lattices are complete and provide a simple criterion for Golodness of monomial ideals whose lcm-lattices are complete.
Keywords
Diagonal arrangements , Poincaré series , Monomial rings , Poset homology
Journal title
Journal of Algebra
Serial Year
2007
Journal title
Journal of Algebra
Record number
697896
Link To Document