Afshin Goodarzi: The Herzog-Takayama resolution is cellular
Afshin Goodarzi, KTH
Tid: On 2013-10-23 kl 10.15 - 12.00
Plats: Room 3418, 4th floor, Department of Mathematics, KTH
Given a monomial ideal I in a polynomial ring, a free resolution of I is said to be cellular if it can be derived from the chain complex of a cell complex whose vertices are labelled by the generators of I. The Herzog-Takayama resolution is the minimal free resolution for the so-called class of ideals with regular linear quotients. This class contains all matroidal and stable ideals whose free resolutions are known to be cellular. In this talk, we will present a brief introduction to the subject and show that the Herzog-Takayama resolution is cellular.