Double transitivity of Galois Groups in Schubert Calculus of Grassmannians Institutional Repository Document uri icon

abstract

  • We investigate double transitivity of Galois groups in the classical Schubert calculus on Grassmannians. We show that all Schubert problems on Grassmannians of 2- and 3-planes have doubly transitive Galois groups, as do all Schubert problems involving only special Schubert conditions. We use these results to give a new proof that Schubert problems on Grassmannians of 2-planes have Galois groups that contain the alternating group. We also investigate the Galois group of every Schubert problem on Gr(4,8), finding that each Galois group either contains the alternating group or is an imprimitive permutation group and therefore fails to be doubly transitive. These imprimitive examples show that our results are the best possible general results on double transitivity of Schubert problems.

author list (cited authors)

  • Sottile, F., & White, J.

complete list of authors

  • Sottile, Frank||White, Jacob

publication date

  • December 2013