Mirabolic Robinson-Schensted-Knuth correspondence

Abstract

The set of orbits of GL(V) in Fl(V)× Fl(V)× V is finite, and is parametrized by the set of certain decorated permutations in a work of Solomon. We describe a Mirabolic RSK correspondence (bijective) between this set of decorated permutations and the set of triples: a pair of standard Young tableaux, and an extra partition. It gives rise to a partition of the set of orbits into combinatorial cells. We prove that the same partition is given by the type of a general conormal vector to an orbit. We conjecture that the same partition is given by the bimodule Kazhdan-Lusztig cells in the bimodule over the Iwahori-Hecke algebra of GL(V) arising from Fl(V)× Fl(V)× V. We also give conjectural applications to the classification of unipotent mirabolic character sheaves on GL(V)× V.