Gr\"obner basis and Anick's resolution for U_{F_2}(sl^+_3)

Ivan Yudin

arXiv:1003.2197·math.RT·March 11, 2010

Gr\"obner basis and Anick's resolution for U_{F_2}(sl^+_3)

Ivan Yudin

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TL;DR

This paper computes the initial steps of a minimal projective resolution for the trivial module over a specific algebra related to sl^+_3, providing insights into its algebraic structure.

Contribution

It introduces the first three steps of a minimal projective resolution for U_{F_2}(sl^+_3), advancing understanding of its homological properties.

Findings

01

Computed the first three steps of the resolution

02

Provided explicit algebraic structures involved

03

Enhanced understanding of U_{F_2}(sl^+_3) homology

Abstract

We compute three first steps of a minimal projective resolution for the trivial module over U_{F_2}(sl^+_3).

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Taxonomy

TopicsCommutative Algebra and Its Applications · Algebraic structures and combinatorial models · Algebraic Geometry and Number Theory