Title :
Structure selection for bounded-parameter models: consistency conditions and selection criterion
Author :
Veres, Shdor M. ; Norton, John P.
Author_Institution :
Sch. of Electron. & Electr. Eng., Birmingham Univ., UK
fDate :
4/1/1991 12:00:00 AM
Abstract :
Strong-consistency conditions for structure selection in bounded-parameter models are studied. A certain robust selection criterion, based on the volume of the exact parameter-bounding polytope, is proposed for linear regression models. The effectiveness of the polytope volume criterion is demonstrated on a model nonlinear in its variables but linear in its parameters. Its strong consistency is proved for a large class of noise distributions. The usual assumptions on the noise, namely independence, constant variance, or martingale difference properties, need not be made, but asymptotic independence is assumed
Keywords :
identification; bounded-parameter models; consistency conditions; linear regression models; martingale difference; polytope volume criterion; selection criterion; structure selection; variance; Control design; Distributed computing; Ellipsoids; Error correction; Gaussian noise; Helium; Noise robustness; Random variables; Solid modeling; Sufficient conditions;
Journal_Title :
Automatic Control, IEEE Transactions on
