Sampling solutions of Schr\"odinger equations on combinatorial graphs
Abstract
We consider functions on a graph G whose evolution in time -∞<t<∞ is governed by a Schr\"odinger type equation with a combinatorial Laplace operator on the right side. For a given subset S of vertices of G we compute a cut-off frequency ω>0 such that solutions to a Cauchy problem with initial data in PWω(G) are completely determined by their samples on S× \kπ/ω\, where k∈ N. It is shown that in the case of a bipartite graph our results are sharp.
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