A Note on Kottwitz's Invariante(G)

Let c E IN. For d E Z with gcd (d, c) = 1 let 6(d, c) be defined by d . 6 ( d , c) I 1 mod c, 1 5 6(d, c) 5 c. Let s, t E IN with 1 5 s 5 c, 1 5 t 5 c. The main result is that for arbitrary fixed E > 0, but uniformly over c, s and t, # { d E I N : ( ~, d ) = l , I 5 d S S and 1 < 6 ( d , c ) < t } =

A new proof is given of the nonuniform version of Fisher's inequality, first proved by Majumdar. The proof is ``elementary,'' in the sense of being purely combinatorial and not using ideas from linear algebra. However, no nonalgebraic proof of the n-dimensional analogue of this result (Theorem 3 her

## Abstract Grzegorczyk's modal logic (Grz) corresponds to the class of upwards well‐founded partially ordered Kripke frames, however all known proofs of this fact utilize some form of the Axiom of Choice; G. Boolos asked in [1], whether it is provable in plain ZF. We answer his question negatively