Title :
Wald statistic for model order selection in superposition models
Author :
Sabharwal, Ashutosh ; Potter, Lee
Author_Institution :
Dept. of Electr. & Comput. Eng., Houston Univ., TX, USA
fDate :
4/1/2002 12:00:00 AM
Abstract :
A consistent model selection algorithm is presented for superimposed signal models. The proposed method is motivated by the Wald statistic and reduces the computational complexity of procedures based on the minimum description length (MDL) principle. The procedure is suggested when a noncyclostationary signal model or short data length prevents use of covariance rank test. For maximum model-order K, the procedure provides O(K) computational savings over an MDL test. Additionally, a proof establishes the consistency of a least-squares estimator using overparametrized. models. Finite sample performance of the proposed model selection method is studied via Monte Carlo simulations for estimating the multipath delays and amplitudes of a chirp signal
Keywords :
Monte Carlo methods; amplitude estimation; computational complexity; delay estimation; least squares approximations; multipath channels; signal sampling; statistical analysis; MDL principle; Monte Carlo simulations; Wald statistic; chirp signal amplitude; computational complexity; least-squares estimator; minimum description length principle; model order selection; multipath delays; noncyclostationary signal model; overparametrized. models; short data length; superposition models; Amplitude estimation; Computational complexity; Delay estimation; Geophysics computing; Maximum likelihood estimation; Multipath channels; Parameter estimation; Signal processing; Statistics; Testing;
Journal_Title :
Signal Processing, IEEE Transactions on
