On the characters of the Sylow p-subgroups of untwisted Chevalley groups Yn(pa)

Abstract

Let UYn(q) be a Sylow p-subgroup of an untwisted Chevalley group Yn(q) of rank n defined over Fq where q is a power of a prime p. We partition the set Irr(UYn(q)) of irreducible characters of UYn(q) into families indexed by antichains of positive roots of the root system of type Yn. We focus our attention on the families of characters of UYn(q) which are indexed by antichains of length 1. Then for each positive root α we establish a one to one correspondence between the minimal degree members of the family indexed by α and the linear characters of a certain subquotient Tα of UYn(q). For Yn = An our single root character construction recovers amongst other things the elementary supercharacters of these groups. Most importantly though this paper lays the groundwork for our classification of the elements of Irr(UEi(q)), 6 i 8 and Irr(UF4(q)).