An affirmative answer to a question on connectivity of p-subgroup posets with irreducible characters

Abstract

Let p be a prime, e a nonnegative integer, and G a finite p-group with pe+1 dividing |G|. Let I be the intersection of all subgroups of order pe+1 in G. It is proved that |I Z(G)| |π0(p,e(G))| Irr(I), where p,e(G), whose connected components is denoted by π0(p,e(G)), is the poset consisting of all pairs (H, ) with H G, |H| pe+1, and ∈ Irr(H). Hence, an affirmative answer to Question 2 raised by Meng and Yang is obtained.