On l-parabolic Hecke algebras of symmetric groups

Abstract

Let H=Hq(n) be the Hecke algebra of the symmetric group of degree n, over a field of arbitrary characteristic, and where q is a primitive l-th root of unity in K. Let H be an l-parabolic subalgebra of H. We give an elementary explicit construction for the basic algebra of a non-simple block of H. We also discuss homological properties of H-modules, in particular existence of varieties for modules, and some consequences.