UMN Commutative Algebra Seminar, Fall 2021

Bring your lunch and meet outside of Vincent Hall at noon to get to know the rest of the commutative algebra group and discuss potential speakers for the semester. You can also join lunch over Zoom if you prefer.

We consider a smooth complex variety endowed with the action of a linear algebraic group, such as a toric variety, space of matrices, or flag variety. Given an orbit, the local cohomology modules with support in its closure encode a great deal of information about its singularities and topology. We will discuss how techniques from representation theory, D-modules, and quivers may be used to compute these local cohomology modules and their related invariants.

Motivated by toric geometry, Maclagan-Smith defined the multigraded Castelnuovo-Mumford regularity for sheaves on a simplicial toric variety. While this definition reduces to the usual definition on a projective space, other descriptions of regularity in terms of the Betti numbers, local cohomology, or resolutions of truncations of the corresponding graded module proven by Eisenbud and Goto are no longer equivalent. I will discuss recent joint work with Lauren Cranton Heller and Juliette Bruce on generalizing Eisenbud-Goto's conditions to the "easiest difficult" case, namely products of projective spaces, and our hopes and dreams for how to do the same for other toric varieties.

Differential modules are a generalization of chain complexes at least dating back to Cartan and Eilenberg, and have recently become an important framework for studying questions related to the ranks of syzygies and extensions of the BGG correspondence to non-standard gradings. Many properties that we take for granted in the case of modules and complexes fail for differential modules, but recent results of Brown and Erman indicate that minimal free resolutions still play an important role in the study of homological properties of differential modules. In this talk, we will introduce a "Koszul differential module", which generalizes the classical Koszul complex and serves as a free flag resolution for certain classes of differential modules with complete intersection homology. This is joint work with Maya Banks. 

Toric face rings, introduced by Stanley, are simultaneous generalizations of Stanley--Reisner rings and affine semigroup rings, among others. We use the combinatorics of the fan underlying these rings to inductively compute their rings of differential operators. Along the way, we discover a new differential characterization of the Gorenstein property for affine semigroup rings. This is joint work with C-Y. Jean Chan, Patricia Klein, Laura Matusevich, Janet Page, and Janet Vassilev.

Orbital varieties, first studied by Joseph in the context of the representation theory of symmetric groups, are certain subvarieties of upper triangular nilpotent matrices. The inclusion order on orbital varieties induces a partial order (the geometric order) on standard Young tableaux. A combinatorial description of the geometric order remains elusive in all but a few cases, which I will describe in this talk. I will also discuss the relationship with Schubert calculus, and recent progress and conjectures towards a description of the geometric order.

We study asymptotic homological properties of random quadratic monomial ideals in a polynomial ring R = k[x_1, . . . , x_n], utilizing methods from the Erdos-Renyi model of random graphs. Here we consider a graph on n vertices and exclude an edge (corresponding to a quadratic generator of the ideal I) with probability p, and consider algebraic properties as n tends to infinity. Our main results involve fixing the edge parameter p = p(n) so that asymptotically almost surely the Krull dimension of R/I is fixed. Under these conditions we establish various properties regarding the Betti table of R/I, including sharp bounds on regularity and projective dimension and distribution of nonzero Betti numbers. These results extend work of Erman-Yang, who studied such ideals in the context of conjectured phenomena in the nonvanishing of asymptotic syzygies. Our results use collapsibility properties of random clique complexes and Garland’s method regarding spectral gaps of graphs, and in particular rely on the underlying field in some cases. This is joint work with Andrew Newman.