Article ID Journal Published Year Pages File Type
4589480 Journal of Algebra 2006 9 Pages PDF
Abstract

In a recent paper Külshammer, Olsson, Robinson gave a d-analogue for the Nakayama conjecture for symmetric groups where d⩾2 is an arbitrary integer. We prove that there is a natural d-analogue of the Nakayama conjecture for alternating groups whenever d is 2 or an arbitrary odd integer greater than 1. This generalizes an old result of Kerber.

Related Topics
Physical Sciences and Engineering Mathematics Algebra and Number Theory