Control systems on Lie groups

In thii paper, we present a new result on algebraic characterization of observability of a class of control systems, called the Bilinear Control systems on Lie Groups, introduced in the paper; and then extend this result to the direct product of two members in this class. The latter generalizes a re

We exhibit some classes of Lie groups, and a set of open assumptions on these groups, such that, under these assumptions, the 'controllability rank condition' becomes a necessary and sufficient condition for controllability of right invariant systems. condition when .L#(A, B), the Lie algebra gener

For a control system on a matrix Lie group with one or more conÿguration constraints that are not left/right invariant, ÿnding the combinations of (kinematic) control inputs satisfying the motion constraints is not a trivial problem. Two methods, one coordinate-dependent and the other coordinate-fre

We define a restricted structure for Lie triple systems in the characteristic p ) 2 setting, akin to the restricted structure for Lie algebras, and initiate a study of a theory of restricted modules. In general, Lie triple systems have natural embeddings into certain canonical Lie algebras, the so-c