Abstract
In this paper, we study the behavior of the angular resolution limit (ARL) for two closely spaced sources in the context of array processing. Particularly, we derive new closed-form expressions of the ARL, denoted by δ, for three methods: the first one, which is the main contribution of this work, is based on the Stein's lemma which links the Chernoff's distance and a given/fixed probability of error, P e , associated to the binary hypothesis test: H 0 : δ = 0 versus H 1 : δ = 0. The two other methods are based on the well-known Lee and Smith's criteria using the Cramer-Rao Bound (CRB). We show that the proposed ARL based on the Stein's lemma and the one based on the Smith's criterion have a similar behavior and they are proportional by a factor which depends only on P fa and P d and not on the model parameters (number of snapshots, sensor, sources, ….). Another conclusion is that for orthogonal signals and/or for a large number of snapshots, it is possible to give an unified closed-form expression of the ARL for the three approaches.
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