Observability of linear systems on the Heisenberg Lie group
Abstract
In control theory, understanding the observability property of a system is crucial for effectively managing and controlling dynamical systems. This property empowers us to deduce the internal state of a system from its outputs over time, even when direct measurements are impossible. By harnessing observability, we can accurately estimate the complete state of a system and reconstruct its dynamics using just limited information. In this work, we will find conditions for observability of linear systems in the three dimensional Heisenberg group H. Considering the homomorphisms between the group and its simply connected subgroups, whose kernel is denoted by K, we will find sufficient conditions for observability on the system using a quotient space H/K as the output.
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