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Alexander duality and total positivity: a cluster/commutative algebra connection

Presenter
December 7, 2012
Keywords:
  • commutative algebra
  • Stanley-Reisner rings
  • algebraic combinatorics
  • Poincare duality
  • cluster algebra
  • determinantal variety
  • totally nonnegative unipotent matrices
MSC:
  • 05-XX
  • 05EXX
  • 05E15
  • 05E40
  • 57P10
  • 13F60
  • 15B48
Abstract
Subword simplicial complexes arose as initial ideals of determinantal ideals, but they have reappeared in numerous contexts connected to Lie groups. In particular, their Alexander duals govern the combinatorics and topology of Lusztig's parametrization of the totally nonnegative unipotent matrices. All of the players will be reviewed from scratch.
Supplementary Materials