Abstract. Let G be a group, Irr(G) be the set of all the irreducible ordinary characters of G, B ∈ Bl(G) be a block of G and Irr(B) be the set of all the irreducible ordinary characters of G which are in the block B. In this paper the object is to study the ordinary irreducible characters of height zero in relation to the Abelian defect groups of the blocks in which such characters sit. We prove that if B ∈ Bl(G) is a block of G with a defect group D such that everyX ∈ Irr(B) has height zero, then D is Abelian.

Keywords: Blocks of characters, height zero of characters, Abelian defect groups of blocks

Quaestiones Mathematicae 37(2014), 331-335