Super-Resolution of Positive Sources on an Arbitrarily Fine Grid

“…He derived both the lower and upper bounds for the minimax error in the amplitude reconstruction, emphasizing the importance of sparsity in the super-resolution. More recently, inspired by the huge success of new super-resolution modalities [8,25,26,45,51] and the popularity of researches for super-resolution algorithms [5,9,18,21,41,42,50], the study of super-resolution capability of imaging problems also becomes popular in applied mathematics. In [16], the authors considered n-sparse point sources supported on a grid (spacing by Δ) and obtained sharper lower and upper bounds for the minimax error of amplitude recovery than those in [20].…”

Dynamic Super-Resolution in Particle Tracking Problems

“…He derived both the lower and upper bounds for the minimax error in the amplitude reconstruction, emphasizing the importance of sparsity in the super-resolution. More recently, inspired by the huge success of new super-resolution modalities [8,25,26,45,51] and the popularity of researches for super-resolution algorithms [5,9,18,21,41,42,50], the study of super-resolution capability of imaging problems also becomes popular in applied mathematics. In [16], the authors considered n-sparse point sources supported on a grid (spacing by Δ) and obtained sharper lower and upper bounds for the minimax error of amplitude recovery than those in [20].…”

Dynamic Super-Resolution in Particle Tracking Problems

“…The modern convex relaxation approach, optimizing the ℓ 1 , total variation, and atomic norms, has been extensively developed in [5,7,8,27,40,41], to name a few. The most active area of theoretical analysis in line spectrum estimation is super-resolution [1][2][3][4][7][8][9][10][11][13][14][15][16][17][18][19][21][22][23][24][25][26][28][29][30]32,33,37,41], where the goal is to recover the spectrum when the minimal separation is smaller than the Rayleigh distance O (1/K). The first work on superresolution stability was [13], where Donoho introduced the concept of the Rayleigh index and demonstrated the connection between the Rayleigh index, super-resolution factor (SRF), and the allowed perturbation size.…”

“…Among these works, several papers have discussed the recovery of positive spikes. For example, [33], and [32] analyzed individual spike recovery errors in terms of the super-resolution factor under Rayleigh regularity assumptions. The result in [37] shows that the spectrum can be exactly recovered without assuming spectral gaps if the observed signal is a noiseless superposition of certain point spread functions, and in particular, Gaussian point spread functions.…”

A note on spike localization for line spectrum estimation

Improved Resolution Estimate for the Two-Dimensional Super-Resolution and a New Algorithm for Direction of Arrival Estimation with Uniform Rectangular Array