On the singularity of the irreducible components of a Springer fiber in sl(n)

Abstract

Let Bu be the Springer fiber over a nilpotent endomorphism u∈ End(Cn). Let J(u) be the Jordan form of u regarded as a partition of n. The irreducible components of Bu are all of the same dimension. They are labelled by Young tableaux of shape J(u). We study the question of singularity of the components of Bu and show that all the components of Bu are nonsingular if and only if J(u)∈\(λ,1,1,...), (λ1,λ2), (λ1,λ2,1), (2,2,2)\.