Operations on Arc Diagrams and Degenerations for Invariant Subspaces of Linear Operators. Part II

Abstract

For a partition β, denote by Nβ the nilpotent linear operator of Jordan type β. Given partitions β, γ, we investigate the representation space 2 Vγβ of all short exact sequences E: 0 Nα Nβ Nγ 0 where α is any partition with each part at most 2. Due to the condition on α, the isomorphism type of a sequence E is given by an arc diagram ; denote by V the subset of 2 Vγβ of all sequences isomorphic to E. Thus, the space 2 Vγβ carries a stratification given by the subsets of type V. We compute the dimension of each stratum and show that the boundary of a stratum V consists exactly of those V' where ' is obtained from by a non-empty sequence of arc moves of five possible types (A) -- (E). The case where all three partitions are fixed has been studied in [3] and [4]. There, arc moves of types (A) -- (D) suffice to describe the boundary of a V in Vα,γβ. Our fifth move (E), "explosion", is needed to break up an arc into two poles to allow for changes in the partition α.