Special restricted partition functions for the stable sheaf cohomology on flag varieties

Abstract

Let a:=(a1,…,ar) be a sequence of positive integers, d≥ 2 and j≥ 1, some integers. We study the functions p a,d(n):= the number of integer solutions (x1,…,xr) of Σi=1r aixi=n, with xi≥ 0 and xi 0,1(\;d), for all 1≤ i≤ r, and p a,d(n;j):= the number of (x1,…,xr) as above which satisfy also the condition Σi=1r (xi-(d-2) xid ) =j. We give formulas for p a,d(n) and its polynomial part P a,d(n), and also for p a,d(n;j). As an application, we compute the dimensions of the stable cohomology groups for certain line bundles associated to flag varieties, defined over an algebraically closed field of positive characteristic.