TY - GEN
T1 - Online functional prediction for spatio-temporal systems using a generalized time-varying radial basis function networks framework
AU - Su, Jionglong
AU - Dodd, T. J.
PY - 2010
Y1 - 2010
N2 - In this paper, functional prediction is carried out for spatio-temporal systems in which the spatial data is irregularly sampled. We propose a novel method called Kalman Filter Radial Basis Function (KF-RBF) for such a purpose. It casts the problem into a Reproducing Kernel Hilbert Space (RKHS) defined by some continuous, symmetric and positive definite Radial Basis Function (RBF), thereby allowing for irregular sampling in the spatial domain. A Functional Auto-Regressive (FAR) model describing the system evolution in the temporal domain is further assumed. The FAR model is then formulated in a generalized Vector Auto-Regressive (VAR) framework embedded into a Kalman Filter (KF). This is achieved by projecting the unknown functions onto a time-invariant functional subspace. Subsequently, the weight vectors obtained become inputs into a Kalman Filter (KF). In this way, nonstationary functions can be forecasted by evolving these weight vectors.
AB - In this paper, functional prediction is carried out for spatio-temporal systems in which the spatial data is irregularly sampled. We propose a novel method called Kalman Filter Radial Basis Function (KF-RBF) for such a purpose. It casts the problem into a Reproducing Kernel Hilbert Space (RKHS) defined by some continuous, symmetric and positive definite Radial Basis Function (RBF), thereby allowing for irregular sampling in the spatial domain. A Functional Auto-Regressive (FAR) model describing the system evolution in the temporal domain is further assumed. The FAR model is then formulated in a generalized Vector Auto-Regressive (VAR) framework embedded into a Kalman Filter (KF). This is achieved by projecting the unknown functions onto a time-invariant functional subspace. Subsequently, the weight vectors obtained become inputs into a Kalman Filter (KF). In this way, nonstationary functions can be forecasted by evolving these weight vectors.
KW - Functional auto-regressive
KW - Kalman filter
KW - Radial basis function
UR - http://www.scopus.com/inward/record.url?scp=78650587758&partnerID=8YFLogxK
U2 - 10.1109/ICIEEM.2010.5646577
DO - 10.1109/ICIEEM.2010.5646577
M3 - Conference Proceeding
AN - SCOPUS:78650587758
SN - 9781424464814
T3 - Proceedings - 2010 IEEE 17th International Conference on Industrial Engineering and Engineering Management, IE and EM2010
SP - 439
EP - 443
BT - Proceedings - 2010 IEEE 17th International Conference on Industrial Engineering and Engineering Management, IE and EM2010
T2 - 17th International Conference on Industrial Engineering and Engineering Management, IE and EM2010
Y2 - 29 October 2010 through 31 October 2010
ER -