Super-resolution of positive near-colliding point sources

Abstract

In this paper, we analyze the capacity of super-resolution of one-dimensional positive sources. In particular, we consider the same setting as in [arXiv:1904.09186v2 [math.NA]] and generalize the results there to the case of super-resolving positive sources. To be more specific, we consider resolving d positive point sources with p ≤slant d nodes closely spaced and forming a cluster, while the rest of the nodes are well separated. Similarly to [arXiv:1904.09186v2 [math.NA]], our results show that when the noise level ε SRF-2 p+1, where SRF=( )-1 with being the cutoff frequency and the minimal separation between the nodes, the minimax error rate for reconstructing the cluster nodes is of order 1 SRF2 p-2 ε, while for recovering the corresponding amplitudes \aj\ the rate is of order SRF2 p-1 ε. For the non-cluster nodes, the corresponding minimax rates for the recovery of nodes and amplitudes are of order ε and ε, respectively. Our numerical experiments show that the Matrix Pencil method achieves the above optimal bounds when resolving the positive sources.

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