On controllability, observability and stabilizability of the heat equation on discrete graphs
Abstract
We consider linear control problems for the heat equation of the form f (t) = -Hf (t) + 1D u (t), f (0) ∈ 2 (X,m), where H is the weighted Laplacian on a discrete graph (X,b,m), and where D ⊂eq X is relatively dense. We show cost-uniform α-controllability by means of a weak observability estimate for the corresponding dual observation problem. We discuss optimality of our result as well as consequences on stabilizability properties.
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