Super-resolution of near-colliding point sources

Abstract

We consider the problem of stable recovery of sparse signals of the form F(x)=Σj=1d ajδ(x-xj), xj∈R,\;aj∈C, from their spectral measurements, known in a bandwidth with absolute error not exceeding ε>0. We consider the case when at most p d nodes \xj\ of F form a cluster whose extent is smaller than the Rayleigh limit 1, while the rest of the nodes are well separated. Provided that ε SRF-2p+1, where SRF=()-1 and is the minimal separation between the nodes, we show that the minimax error rate for reconstruction of the cluster nodes is of order 1SRF2p-1ε, while for recovering the corresponding amplitudes \aj\ the rate is of the order SRF2p-1ε. Moreover, the corresponding minimax rates for the recovery of the non-clustered nodes and amplitudes are ε and ε, respectively. These results suggest that stable super-resolution is possible in much more general situations than previously thought. Our numerical experiments show that the well-known Matrix Pencil method achieves the above accuracy bounds.