Hilbert's Syzygy theorem says that every finitely generated graded module over a polynomial ring has a graded minimal free resolution of finite length. The graded free modules appearing in such a resolution are completely specified by the graded betti numbers. In this talk, we shall try to understand the possible
collection of integers that can appear as the betti numbers of a module. The discussion will be following a theory due to Boij-Soederberg and Eisenbud-Schreyer. This talk should be accessible to everybody.
The link for the meeting is: https://umich.zoom.us/j/94949291807 Speaker(s): Alapan Mukhopadhyay (University of Michigan)
collection of integers that can appear as the betti numbers of a module. The discussion will be following a theory due to Boij-Soederberg and Eisenbud-Schreyer. This talk should be accessible to everybody.
The link for the meeting is: https://umich.zoom.us/j/94949291807 Speaker(s): Alapan Mukhopadhyay (University of Michigan)
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