Semigroups and Controllability of Invariant Control Systems on Sl(n,H)
Abstract
Let Sl( n,H) be the Lie group of n× n quaternionic matrices g with g =1. We prove that a subsemigroup S ⊂ Sl( n,H) with nonempty interior is equal to Sl( n,H) if S contains a subgroup isomorphic to Sl( 2,H). As application we give sufficient conditions on A,B∈ sl( n,H) to ensuring that the invariant control system g=Ag+uBg is controllable on Sl( n,H). We prove also that these conditions are generic in the sense that we obtain an open and dense set of controllable pairs ( A,B)∈sl( n,H)2.
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