Linearity of Free Resolutions of Monomial Ideals

We study monomial ideals with linear presentation or partially linear resolution. We give combinatorial characterizations of linear presentation for square-free ideals of degree 3, and for primary ideals whose resolutions are linear except for the last step (the “almost linear” case). We also give sharp bounds on Castelnuovo-Mumford regularity and numbers of generators in some cases. It is a basic observation that linearity properties are inherited by the restriction of an ideal to a subset of variables, and we study when the converse holds. We construct fractal examples of almost linear primary ideals with relatively few generators related to the Sierpiński triangle. Our results also lead to classes of highly connected simplicial complexes ∆ that can not be extended to the complete dim ∆-skeleton of the simplex on the same variables by shelling.

[1]  J. Herzog,et al.  On the bettinumbers of finite pure and linear resolutions , 1984 .

[2]  Thomas Kahle,et al.  Linear syzygies, flag complexes, and regularity , 2014, Collectanea Mathematica.

[3]  S. Takagi,et al.  On the relationship between depth and cohomological dimension , 2015, Compositio Mathematica.

[4]  N. Terai,et al.  H-vectors of simplicial complexes with Serre's conditions , 2009, 0912.1089.

[5]  Ralf Fröberg,et al.  On Stanley-Reisner rings , 1990 .

[6]  Hailong Dao,et al.  Minimal Cohen-Macaulay Simplicial Complexes , 2019, SIAM J. Discret. Math..

[7]  D. Eisenbud,et al.  The regularity of Tor and graded Betti Numbers , 2004, math/0405373.

[8]  Uwe Nagel,et al.  A tour of the Weak and Strong Lefschetz Properties , 2011, 1109.5718.

[9]  Mauricio Velasco,et al.  Frames and degenerations of monomial resolutions , 2011 .

[10]  Jay Schweig,et al.  Bounds on the regularity and projective dimension of ideals associated to graphs , 2011, 1110.2570.

[11]  Ali Akbar Yazdan Pour,et al.  Green-Lazarsfeld index of square-free monomial ideals and their powers , 2021 .

[12]  D. Eisenbud,et al.  Betti numbers of graded modules and cohomology of vector bundles , 2007, 0712.1843.

[13]  Volkmar Welker,et al.  The LCM-lattice in monomial resolutions , 1999 .

[14]  D. Eisenbud,et al.  Restricting linear syzygies: algebra and geometry , 2004, Compositio Mathematica.

[15]  Adam Boocher,et al.  Free Resolutions and Sparse Determinantal Ideals , 2011, 1111.0279.