On the symmetric group action on rigid disks on a strip

Abstract

In this paper we decompose the rational homology of the ordered configuration space of p open unit-diameter disks on the infinite strip of width 2 as a direct sum of induced Sn-representations. Alpert proved that the kth-integral homology of the ordered configuration space of n open unit-diameter disks on the infinite strip of width 2 is an FIk+1-module by studying certain operations on homology called "high-insertion maps." The integral homology groups Hk(cell(n,2)) are free abelian, and Alpert computed a basis for Hk(cell(n,2)) as an abelian group. In this paper, we study the rational homology groups as Sn-representations. We find a new basis for Hk(cell(n,2);Q), and use this, along with results of Ramos, to give an explicit description of Hk(cell(n,2);Q) as a direct sum of induced Sn-representations arising from free FI*-modules. We use this decomposition to calculate the dimension of the rational homology of the unordered configuration space of p open unit-diameter disks on the infinite strip of width 2.