GLRT-Based Threshold Detection-Estimation Performance Improvement and Application to Uniform Circular Antenna Arrays | 15 | 0.90 | 2007 |
PERFORMANCE ANALYSIS OF DOA ESTIMATION USING UNIFORM CIRCULAR ANTENNA ARRAYS IN THE THRESHOLD REGION | 3 | 0.53 | 2004 |
Detection-estimation of more uncorrelated Gaussian sources than sensors in nonuniform linear antenna arrays. II. Partially augmentable arrays | 18 | 1.57 | 2003 |
DOA estimation performance breakdown: A new approach to prediction and cure | 7 | 0.68 | 2002 |
Locally optimal maximum-likelihood estimate of a Toeplitz matrix of given rank | 0 | 0.34 | 2001 |
Detection-estimation of more uncorrelated Gaussian sources thansensors in nonuniform linear antenna arrays .I. Fully augmentable arrays | 13 | 1.55 | 2001 |
Detection-estimation of more uncorrelated Gaussian sources than sensors using partially augmentable sparse antenna arrays | 0 | 0.34 | 2000 |
DOA estimation for noninteger linear antenna arrays with more uncorrelated sources than sensors | 7 | 0.75 | 2000 |
Stability of manifold ambiguity resolution in DOA estimation with nonuniform linear antenna arrays | 3 | 0.48 | 2000 |
Resolving manifold ambiguities in direction-of-arrival estimation for nonuniform linear antenna arrays | 25 | 2.38 | 1999 |
Instability in DOA manifold ambiguity resolution | 0 | 0.34 | 1999 |
Identifiability and manifold ambiguity in DOA estimation for nonuniform linear antenna arrays. | 1 | 0.38 | 1999 |
Comparison of DOA estimation performance for various types of sparse antenna array geometries | 9 | 1.11 | 1996 |
Positive-definite Toeplitz completion in DOA estimation for fully-augmentable nonuniform linear antenna arrays. | 3 | 0.85 | 1996 |