Stefan Kunis, Dominik Nagel
Published 2019-07-16Version 1
We prove lower bounds for the smallest singular value of rectangular, multivariate Vandermonde matrices with nodes on the complex unit circle. The nodes are ``off the grid'', groups of nodes cluster, and the studied minimal singular value is bounded below by the product of inverted distances of a node to all other nodes in the specific cluster. By providing also upper bounds for the smallest singular value, this completely settles the univariate case and pairs of nodes in the multivariate case, both including reasonable sharp constants. For larger clusters, we show that the smallest singular value depends also on the geometric configuration within a cluster.
Comments: 18 pages, 5 figures
Multivariate Vandermonde matrices with separated nodes on the unit circle are stable
Single-exponential bounds for the smallest singular value of Vandermonde matrices in the sub-Rayleigh regime
The $β$ maps and the strong clustering at the complex unit circle
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