Classifications of -colored d-complete posets and upper P-minuscule Borel representations

Abstract

The -colored d-complete posets correspond to certain Borel representations that are analogous to minuscule representations of semisimple Lie algebras. We classify -colored d-complete posets which specifies the structure of the associated representations. We show that finite -colored d-complete posets are precisely the dominant minuscule heaps of J.R. Stembridge. These heaps are reformulations and extensions of the colored d-complete posets of R.A. Proctor. We also show that connected infinite -colored d-complete posets are precisely order filters of the connected full heaps of R.M. Green.