A Birkhoff-Bruhat Atlas for partial flag varieties

Abstract

A partial flag variety PK of a Kac-Moody group G has a natural stratification into projected Richardson varieties. When G is a connected reductive group, a Bruhat atlas for PK was constructed by He, Knutson and Lu: PK is locally modeled with Schubert varieties in some Kac-Moody flag variety as stratified spaces. The existence of Bruaht atlases implies some nice combinatorial and geometric properties on the partial flag varieties and the decomposition into projected Richardson varieties. A Bruhat atlas does not exist for partial flag varieties of an arbitrary Kac-Moody group due to combinatorial and geometric reasons. To overcome obstructions, we introduce the notion of Birkhoff-Bruhat atlas. Instead of the Schubert varieties used in a Bruhat atlas, we use the J-Schubert varieties for a Birkhoff-Bruhat atlas. The notion of the J-Schubert varieties interpolates Birkhoff decomposition and Bruhat decomposition of the full flag variety (of a larger Kac-Moody group). The main result of this paper is the construction of a Birkhoff-Bruhat atlas for any partial flag variety PK of a Kac-Moody group. We also construct a combinatorial atlas for the index set QK of the projected Richardson varieties in PK. As a consequence, we show that QK has some nice combinatorial properties. This gives a new proof and generalizes the work of Williams in the case where the group G is a connected reductive group.